All citations by type - Department of Mathematics ...jorgen/allcit.pdf · Self Existence of smooth solutions to the classical moment problems, ... M.R. 92j:44005 [T. Constantinescu].

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JorgensenPublished (co-editor with R. Curto) \textit{Algebraic Methods in Operator Theory,} Birkhauser, Boston, 1994 (papers presented at the 1992 GPOTS conference held at the University of Iowa and organized by R. Curto and P.E.T. Jorgensen).

CitationType CitationData

Non-Self Odzijewicz, A;TI Quantum algebras and q-special functions related to coherent; states maps of the disc;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 183;EP 215;PG 33;JI Commun. Math. Phys.;PY 1998;PD MAR;VL 192;IS 1;GA ZD168;J9 COMMUN MATH PHYS;UT ISI:00

Non-Self Paolucci, A; Tsohantjis, I;TI Hopf-type deformed oscillators, their quantum double and a q-; deformed Calogero-Vasiliev algebra;SO PHYSICS LETTERS A;BP 27;EP 34;PG 8;JI Phys. Lett. A;PY 1997;PD SEP 8;VL 234;IS 1;GA XY306;J9 PHYS LETT A;UT ISI:A1997XY3

Non-Self Weaver, N; TI Lipschitz algebras and derivations of von Neumann algebras; SO JOURNAL OF FUNCTIONAL ANALYSIS; BP 261; EP 300; PG 40; JI J. Funct. Anal.; PY 1996; PD AUG 1; VL 139; IS 2; GA VC315; J9 J FUNCT ANAL; UT ISI:A1996VC31500001;

Self (with L.M. Schmitt and R.F. Werner) Positive representations of general commutation relations allowing Wick ordering, \textit{J.~Funct.\ Anal.}% \ \textbf{134} (1995), 33--99. M.R. 96h:81033 [W\l adys\l aw Adam Majewski]. \newline http://arXiv.org/abs/fun

Self (with R.F. Werner) Coherent states of the $q$-canonical commutation relations, \textit{Comm.\ Math.\ Phys.}\ \textbf{164 }(1994), 455--471. M.R. 95k:81071 [Ken Dykema]. \newline http://arXiv.org/abs/funct-an/9303002

JorgensenPublished (with C.J.K. Batty, O. Bratteli, and D.W. Robinson) Asymptotics of periodic subelliptic operators, \textit{J.~Geom.\ Anal.}\ \textbf{5} (1995), 427--443. M.R. 97f:35028 [Thierry Coulhon].


Non-Self Davies, EB; Non-Gaussian aspects of heat kernel behaviour; J LOND MATH SOC 55: 105-125 Part 1 FEB 1997

Non-Self Lott, J; Remark about heat diffusion on periodic spaces; P AM MATH SOC 127: (4) 1243-1249 APR 1999

Self (with O.~Bratteli and D.W.~Robinson) Spectral asymptotics of periodic elliptic operators, \textit{Math.~Z.} \textbf{232} (1999), 621--650. \newline http://arXiv.org/abs/funct-an/9707002

JorgensenPublished (with co-author R.T. Moore) \textit{Operator Commutation Relations,} Mathematics and Its Applications, D.~Reidel Publishing Co., Dordrecht--Boston--Lancaster, 1984. Z.M. 535:47020 [F.H. Vasilescu]; M.R. 86i:22006 [D.W. Robinson]; \textit{Current Contents}


Non-Self RUSINEK, J;TI ANALYTIC VECTORS AND INTEGRABILITY OF LIE-ALGEBRA; REPRESENTATIONS;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 10;EP 23;PG 14;JI J. Funct. Anal.;PY 1987;PD SEP;VL 74;IS 1;GA J6514;J9 J FUNCT ANAL;UT ISI:A1987J651400002;

Non-Self INOUE, A;TI SELF-ADJOINTNESS OF THE STAR-REPRESENTATION GENERATED BY THE; SUM OF 2 POSITIVE LINEAR FUNCTIONALS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 665;EP 674;PG 10;JI Proc. Amer. Math. Soc.;PY 1989;PD NOV;VL 107;IS 3;GA CB896;J9 PROC

Friday, December 01, 2000

Non-Self ANTOINE, JP; KARWOWSKI, W;TI COMMUTING NORMAL OPERATORS IN PARTIAL OP-STAR-ALGEBRAS;SO ANNALES DE L INSTITUT HENRI POINCARE-PHYSIQUE THEORIQUE;BP 161;EP 185;PG 25;JI Ann. Inst. Henri Poincare-Phys. Theor.;PY 1989;VL 50;IS 2;GA U9086;J9 ANN INST HENRI PO

RUSINEK, J;TI ON GENERALIZED CANONICAL COMMUTATION RELATIONS;SO STUDIA MATHEMATICA;BP 175;EP 181;PG 7;JI Studia Math.;PY 1990;VL 96;IS 2;GA DQ860;J9 STUD MATH;UT ISI:A1990DQ86000008;

Self Existence of smooth solutions to the classical moment problems, \textit{Trans.\ Amer.\ Math.\ Soc.}\ \textbf{332} (1992) 839--848. M.R. 92j:44005 [T. Constantinescu].

Self Extensions and index of Hermitian representations, \textit{Publ.\ Res.\ Inst.\ Math.\ Sci.}\ \textbf{25 }(1989) 1--23. M.R. 92b:46086 [A.I. Shtern].

Self (with O. Bratteli) Conservative derivations and dissipative Laplacians, \textit{J.~Funct.\ Anal.}\ \textbf{82 }(1989) 404--411. M.R. 90d:46089 [C.J.K. Batty].

Self (with P.S. Muhly) Self adjoint extensions satisfying the Weyl operator commutation relations, \textit{J.~Analyse Math.}\ \textbf{37} (1980) 46--99. M.R. 82k:47058 [S. Kantorovitz].

Non-Self Bennett, CD;TI Exponentiation of infinite dimensional Z-graded Lie algebras;SO COMMUNICATIONS IN ALGEBRA;BP 4013;EP 4036;PG 24;JI Commun. Algebr.;PY 2000;VL 28;IS 9;GA 341JQ;J9 COMMUN ALGEBRA;UT ISI:000088587600001;

Non-Self PRADO, HE;TI A GEOMETRIC CONSTRUCTION OF LOCAL REPRESENTATIONS OF LOCAL LIE-; GROUPS;SO ACTA APPLICANDAE MATHEMATICAE;BP 87;EP 98;PG 12;JI Acta Appl. Math.;PY 1991;PD OCT;VL 25;IS 1;GA GW298;J9 ACTA APPL MATH;UT ISI:A1991GW29800004;

Self (with Gestur \'{O}lafsson) Unitary representations of Lie groups with reflection symmetry, \textit{{J}.~Funct.\ Anal.}\ \textbf{158} (1998), 26--88. M.R. 99m:22013 [A.L. Onishchik]. \newline http://arXiv.org/abs/funct-an/9707001

Non-Self INOUE, A;TI AN UNBOUNDED GENERALIZATION OF HILBERT-ALGEBRAS;SO JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS;BP 559;EP 568;PG 10;JI J. Math. Anal. Appl.;PY 1989;PD MAR;VL 138;IS 2;GA U3243;J9 J MATH ANAL APPL;UT ISI:A1989U324300020;

Non-Self RIEFFEL, MA;TI CRITICAL-POINTS OF YANG-MILLS FOR NONCOMMUTATIVE 2-TORI;SO JOURNAL OF DIFFERENTIAL GEOMETRY;BP 535;EP 546;PG 12;JI J. Differ. Geom.;PY 1990;PD MAR;VL 31;IS 2;GA CP820;J9 J DIFFEREN GEOM;UT ISI:A1990CP82000013;

Self (with G.L. Price) Extending quasi-free derivations on the CAR-algebra, \textit{J.~Operator Theory\/} \textbf{16 }(1986) 147--155. M.R. 88a:46069 [S. Sakai].

Self Nilpotent ordinary differential operators with polynomial coefficients, \textit{J.~Differential Equations} \textbf{65} (1986) 1--18. 88f:17020 [B. Fuchssteiner].

Non-Self INOUE, A;TI STANDARD PARTIAL O-STAR-ALGEBRAS;SO JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS;BP 555;EP 565;PG 11;JI J. Math. Anal. Appl.;PY 1991;PD NOV 1;VL 161;IS 2;GA GN512;J9 J MATH ANAL APPL;UT ISI:A1991GN51200019;

Self Extensions of positive definite integral kernels on the Heisenberg group, \textit{J.~Funct.\ Anal.}\ \textbf{92} (1990) 474--508. M.R. 91m:22013 [L. Corwin].

Self Second order right-invariant partial differential equations on a Lie group, \textit{J.~Math.\ Anal.\


Self Semigroups of measures in noncommutative harmonic analysis, \textit{Semigroup Forum\/} \textbf{43} (1991) 263--290. M.R. 93e:43002.

Non-Self FRIEDRICH, J; SCHMUDGEN, K;TI N-POSITIVITY OF UNBOUNDED STAR-REPRESENTATIONS;SO MATHEMATISCHE NACHRICHTEN;BP 233;EP 250;PG 18;JI Math. Nachr.;PY 1989;VL 141;GA U8893;J9 MATH NACHR;UT ISI:A1989U889300021;

Non-Self ROBINSON, DW;TI THE DIFFERENTIAL AND INTEGRAL STRUCTURE OF REPRESENTATIONS OF; LIE-GROUPS;SO JOURNAL OF OPERATOR THEORY;BP 95;EP 128;PG 34;PY 1988;PD WIN;VL 19;IS 1;GA P9699;J9 J OPERAT THEOR;UT ISI:A1988P969900007;

Self Representations of differential operators on a Lie group, and conditions for a Lie algebra of operators to generate a representation of the group, \textit{J.~Analyse Math.}\ \textbf{43 }(1983/84), 251--288. Z.M. 568(1985) [Th.\ Farmer]; M.R. 86k:22031 [M.

Non-Self RUSINEK, J;TI PSEUDOTOPOLOGIES WITH APPLICATIONS TO ONE-PARAMETER GROUPS,; VON-NEUMANN-ALGEBRAS, AND LIE-ALGEBRA REPRESENTATIONS;SO STUDIA MATHEMATICA;BP 273;EP 286;PG 14;JI Studia Math.;PY 1993;VL 107;IS 3;GA MK640;J9 STUD MATH;UT ISI:A1993MK64000004;

Self (with O. Bratteli, G. Elliott, and F. Goodman) On Lie algebras of operators, \textit{J.~Funct.\ Anal.}\ \textbf{86} (1989) 341--359. M.R. 90j:46056 [C.J.K. Batty].

Non-Self FRIEDRICH, J;TI ON 1ST ORDER PARTIAL-DIFFERENTIAL OPERATORS ON BOUNDED REGIONS; OF THE PLANE;SO MATHEMATISCHE NACHRICHTEN;BP 33;EP 47;PG 15;JI Math. Nachr.;PY 1987;VL 131;GA J2056;J9 MATH NACHR;UT ISI:A1987J205600003;

Self Noncommutative differential geometry, quantization, and smooth symmetries of the $C^{\ast}$-algebras associated to topological dynamics, \textit{Integral Equations Operator Theory\/} \textbf{12 }(1989) 632--712. M.R. 91c:46092.

Non-Self Pedersen, S;TI Anticommuting derivations;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 1103;EP 1108;PG 6;JI Proc. Amer. Math. Soc.;PY 1999;PD APR;VL 127;IS 4;GA 186QW;J9 PROC AMER MATH SOC;UT ISI:000079741300022;

Self (with O. Bratteli, F.M. Goodman, and D.W. Robinson) The heat semigroup and integrability of Lie algebras, \textit{J.~Funct.\ Anal.}\ \textbf{79 } (1988) 351--397. M.R. 90a:47105 [C.J.K. Batty].

Self Commutative algebras of unbounded operators, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{123 }(1987) 508--527. M.R. 88e:47088 [W. Timmermann].

Self Analytic continuation of local representations of Lie groups, \textit{Pacific J.\ Math.}\ \textbf{125} (1986), 397--408. M.R. 88m:22030.

ARENDT, W; BATTY, CJK; ROBINSON, DW;TI POSITIVE SEMIGROUPS GENERATED

THEORY;BP 369;EP 407;PG 39;PY 1990;PD SPR;VL 23;IS 2;GA FH592;J9 J OPERAT THEOR;UT ISI:A1990FH59200007;

Non-Self IKEDA, I; INOUE, A;TI INVARIANT SUBSPACES FOR CLOSED ASTERISK-REPRESENTATIONS OF; ASTERISK-ALGEBRAS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 737;EP 745;PG 9;JI Proc. Amer. Math. Soc.;PY 1992;PD NOV;VL 116;IS 3;GA JW519;J9 PROC AMER MATH

Self (with W.H. Klink) Quantum mechanics and nilpotent groups, I: The curved magnetic field, \textit{Publ.\ Res.\ Inst.\ Math.\ Sci.}\ \textbf{21 }(1985), 969--999. Z.M. 601:58027 [M.~Monastyrsky].

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Non-Self PRADO, H;TI SPECTRAL PROPERTIES FOR OPERATORS IN A LIE-ALGEBRA;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 527;EP 530;PG 4;JI Proc. Amer. Math. Soc.;PY 1989;PD JUN;VL 106;IS 2;GA AJ205;J9 PROC AMER MATH SOC;UT ISI:A1989AJ20500037;

Self (with R.T. Powers) Positive elements in the algebra of the quantum problem of moments, \textit{Probab.\ Theory Related Fields\/} (formerly \textit{Z.F.\ Wahrschth.}) \textbf{89} (1991) 131--139. M.R. 92k:47090 [G. Epifanio].

Schrader, Robert(D-FUB) Reflection positivity for the complementary series of ${\rm SL}(2n,{C})$. Publ. Res. Inst. Math. Sci. 22 (1986), no. 1, 119--141.

Self (with F. Goodman) Lie algebras of unbounded derivations, \textit{J.~Funct.\ Anal.}\ \textbf{52} (1983) 369--384. M.R. 85e:47063 [S. Sakai].

Non-Self PEDERSEN, S;TI ANTICOMMUTING SELF-ADJOINT OPERATORS;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 428;EP 443;PG 16;JI J. Funct. Anal.;PY 1990;PD MAR 15;VL 89;IS 2;GA CV442;J9 J FUNCT ANAL;UT ISI:A1990CV44200008;

Non-Self Silvestrov, SD; Turowska, LB;TI Representations of the q-deformed Lie algebra of the group of; motions of the euclidean plane;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 79;EP 114;PG

Non-Self RUSINEK, J;TI NONCOMMUTING UNITARY GROUPS AND LOCAL BOUNDEDNESS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 283;EP 286;PG 4;JI Proc. Amer. Math. Soc.;PY 1987;PD OCT;VL 101;IS 2;GA K2037;J9 PROC AMER MATH SOC;UT ISI:A1987K203700015;

Non-Self RIEFFEL, MA;TI DEFORMATION QUANTIZATION OF HEISENBERG MANIFOLDS;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 531;EP 562;PG 32;JI Commun. Math. Phys.;PY 1989;VL 122;IS 4;GA U6699;J9 COMMUN MATH PHYS;UT ISI:A1989U669900001;

Self Positive definite functions on the Heisenberg group, \textit{Math.~Z.} \textbf{201 }(1989) 455--476. M.R. 90m:22024 [A. Hulanicki].

COMMUTANTS OF; UNBOUNDED OPERATOR-ALGEBRAS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 365;EP 372;PG 8;JI Proc. Amer. Math. Soc.;PY

Self Analytic continuation of local representations of symmetric spaces, \textit{J.~Funct.\ Anal.}\ \textbf{70} (1987) 304--322. 88d:22021 [A. Sitaram].

Non-Self IKEDA, I; INOUE, A;TI ON TYPES OF POSITIVE LINEAR FUNCTIONALS OF ASTERISK-ALGEBRAS;SO JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS;BP 276;EP 288;PG 13;JI J. Math. Anal. Appl.;PY 1993;PD FEB;VL 173;IS 1;GA KR084;J9 J MATH ANAL APPL;UT ISI:A1993KR084

Self Spectral theory of finite volume domains in $\mathbb{R}^{n}$, \textit{Adv.\ Math.}\ \textbf{44} (1982) 105--120. Z.M. 452:47057 [G. Loupias]; M.R. 84k:47024 [G. Litvinov].

JorgensenPublished (with D.P. Proskurin and Yu.\ S. Samo\u{\i}lenko) The kernel of Fock representations of Wick algebras with braided operator of coefficients (\TeX \ manuscript, 14 pages), \textit{Pacific J.\ Math}., to appear. \newline http://arXiv.org/abs/math-ph/0001011


Self (with D.P. Proskurin and Yu.\ S. Samo\u{\i}lenko) A family of *-algebras allowing Wick ordering: Fock representations and universal enveloping C*-algebras, TeX \ manuscript, 9 pages).


Non-Self Proskurin, D;TI Stability of a special class of q(ij)-CCR and extensions of; higher-dimensional

JorgensenPublished (with F. Goodman) Lie algebras of unbounded derivations, \textit{J.~Funct.\ Anal.}\ \textbf{52} (1983) 369--384. M.R. 85e:47063 [S. Sakai].


Non-Self Bratteli, Ola; Digernes, Trond; Goodman, Frederick; Robinson, Derek W. Integration in abelian $C\sp *$-dynamical systems. Publ. Res. Inst. Math. Sci. 21 (1985), no. 5, 1001--1030.

Non-Self Bratteli, Ola; Kishimoto, Akitaka Derivations and free group actions on $C\sp *$-algebras. J. Operator Theory 15 (1986), no. 2, 377--410.

Non-Self Davies, E. B. A generation theorem for operators commuting with group actions. Math. Proc. Cambridge Philos. Soc. 96 (1984), no. 2, 313--320.

Non-Self Kurose, Hideki Perturbations and ground states of $C\sp *$-dynamical systems. Proc. Amer. Math. Soc. 95 (1985), no. 2, 242--246.

Schrader, Robert(D-FUB) Reflection positivity for the complementary series of ${\rm SL}(2n,{C})$. Publ. Res. Inst. Math. Sci. 22 (1986), no. 1, 119--141.

Self (with F.M. Goodman and C. Peligrad) Smooth derivations commuting with Lie group actions, \textit{Math.\ Proc.\ Cambridge Philos.\ Soc.}\ \textbf{99 }(1986) 307--314. M.R. 87d:46077 [C.J.K. Batty].

Self (with O. Bratteli and F. Goodman) Unbounded derivations tangential to compact groups of automorphisms II, \textit{J.~Funct.\ Anal.}\ \textbf{61} (1985) 247--289. M.R. 87h:46130 [S. Sakai].

Self (with O. Bratteli, D.E. Evans, and F.M. Goodman) A dichotomy for derivations on $\mathcal{O}_{n}$, \textit{Publ.\ Res.\ Inst.\ Math.\ Sci.}% \ \textbf{22} (1986) 103--117. M.R. 87e:46082 [C.J.K. Batty].



Representations of differential operators on a Lie group, and conditions for a Lie algebra of operators to generate a representation of the group, \textit{J.~Analyse Math.}\ \textbf{43 }(1983/84), 251--288. Z.M. 568(1985) [Th.\ Farmer]; M.R. 86k:22031 [M.

JorgensenPublished (with F. Goodman) Unbounded derivations commuting with compact group actions, \textit{Comm.\ Math.\ Phys.}\ \textbf{82 }(1981) 399--405. M.R. 83b:46083 [S. Sakai].


Non-Self Batty, C. J. K.; Carey, A. L.; Evans, D. E.; Robinson, Derek W. Extending derivations. Publ. Res. Inst. Math. Sci. 20 (1984), no. 1, 119--130.

Non-Self Bratteli, Ola(N-NTH); Goodman, Frederick M.(1-IA) Derivations tangential to compact group actions: spectral conditions in the weak closure. Canad. J. Math. 37 (1985), no. 1, 160--192.

Non-Self Bratteli, Ola; Digernes, Trond; Robinson, Derek W. Relative locality of derivations. J. Funct. Anal. 59 (1984), no. 1, 12--40.



Non-Self Evans, David E.(4-WARW) Quantum dynamical semigroups, symmetry groups, and locality. Acta Appl. Math. 2 (1984), no. 3-4, 333--352.

Goodman, Frederick M.; Wassermann, Antony J. Unbounded derivations commuting with compact group actions. II. J. Funct. Anal. 55 (1984), no. 3, 389--397.

Non-Self Ikunishi, Akio; Derivations in $C\sp{*} $-algebras commuting with compact actions. Publ. Res. Inst. Math. Sci. 19 (1983), no. 1, 99--106.

Non-Self Longo, Roberto; Peligrad, Costel Noncommutative topological dynamics and compact actions on

Non-Self Ôta, Schôichi Commutants of unbounded derivations in $C\sp{*} $-algebras. J. Reine Angew. Math. 347 (1984), 21--32.

Non-Self Peligrad, C. Derivations of $C^*$-algebras which are invariant under an automorphism group. II. Invariant subspaces and other topics (Timi\cedla soara/Herculane, 1981), pp. 181--194, Operator Theory: Adv. Appl., 6, Birkhäuser, Basel-Boston, Mass., 1982.

Non-Self Powers, Robert T.; Price, Geoffrey; Derivations vanishing on $S(\infty )$. Comm. Math. Phys. 84 (1982), no. 4, 439--447.

Non-Self Price, Geoffrey L. On some nonextendable derivations of the gauge-invariant CAR algebra. Trans. Amer. Math. Soc. 285 (1984), no. 1, 185--201.

Self (with F. Goodman) Unbounded derivations commuting with compact group actions, \textit{Comm.\ Math.\ Phys.}\ \textbf{82 }(1981) 399--405. M.R. 83b:46083 [S. Sakai].


Self (with O. Bratteli and G. Elliott) Decomposition of unbounded derivations into invariant and approximately inner parts, \textit{J.~Reine Angew.\ Math.}% \ \textbf{346 }(1984), 166--193. Z.M. 46055 [B.D. Malviya]; M.R. 85j:46106 [S. Sakai].

Self (with O. Bratteli) Unbounded derivations tangential to compact groups of automorphisms, \textit{J.~Funct.\ Anal.}\ \textbf{48 }(1982) 107--133. M.R. 84b:46073 [S. Sakai].

Self A structure theorem for Lie algebras of unbounded derivations in $C^{\ast}$-algebras \& Appendix, \textit{Compositio Math.}\ \textbf{52 }(1984) 85--98. M.R. 85j:46107 [Y. Katayama].

Self Extensions of unbounded *-derivations in UHF $C^{\ast}$-algebras, \textit{J.~Funct.\ Anal.}\ \textbf{45} (1982) 341--356. M.R. 83g:46057 [S. Sakai].

JorgensenPublished (with G. Price) Index and second quantization, \textit{C.R.\ Math.\ Rep.\ Acad.\ Sci.\ Canada\/} \textbf{11}(6) (1989) 243--248. M.R. 91e:46095 [S. Sakai].


Self (with G. Price) Index theory and second quantization of boundary value problems, \textit{J.~Funct.\ Anal.}\ \textbf{104} (1992) 243--290. M.R. 93i:46121.

JorgensenPublished (with G. Price) Index theory and quantization of boundary value problems, \textit{C.R.\ Math.\ Rep.\ Acad.\ Sci.\ Canada\/} \textbf{11}(6) (1989) 237--242. M.R. 91e:46094 [S. Sakai].




JorgensenPublished


Non-Self Amosov, GG; Bulinskii, AV; The Powers-Arveson index for quasifree dynamical semigroups; MATH NOTES+ 62: (5-6) 781-784 NOV-DEC 1997

Non-Self Kissin, E; Derivations of C-*-algebras and representations on deficiency spaces of skew-symmetric operators; P LOND MATH SOC 76: 476-496 Part 2 MAR 1998

Non-Self KISSIN, E; ON THE UNIQUENESS OF REPRESENTATIONAL INDEXES OF DERIVATIONS OF C-ASTERISK-ALGEBRAS; PAC J MATH 162: (1) 97-120 JAN 1994

Non-Self KISSIN, E; SEMIGROUPS OF REPRESENTATIONAL INDEXES OF DERIVATIONS OF C-ASTERISK-ALGEBRAS; J FUNCT ANAL 126: (1) 139-168 NOV 15 1994

Non-Self Kissin, E; Loginov, AI; Shulman, VS; Derivations of C*-algebras and almost Hermitian representations on Pi(k)-spaces; PAC J MATH 174: (2) 411-430 JUN 1996

Non-Self Kissin, E; Shulman, VS; Dual spaces and isomorphisms of some differential Banach *-algebras of operators; PAC J MATH 190: (2) 329-360 OCT 1999

Non-Self KISSIN, E;TI INDEXES OF UNBOUNDED DERIVATIONS OF C-STAR-ALGEBRAS;SO PACIFIC JOURNAL OF MATHEMATICS;BP 125;EP 150;PG 26;JI Pac. J. Math.;PY 1992;PD JAN;VL 152;IS 1;GA GX881;J9 PAC J MATH;UT ISI:A1992GX88100009;

Non-Self KISSIN, E;TI REPRESENTATIONAL INDEXES OF DERIVATIONS OF C-ASTERISK-ALGEBRAS; AND REPRESENTATIONS OF ASTERISK-ALGEBRAS ON KREIN SPACES;SO JOURNAL FUR DIE REINE UND ANGEWANDTE MATHEMATIK;BP 71;EP 92;PG 22;JI J. Reine Angew. Math.;PY 1993;VL 439;GA LK232;J

Non-Self Negrin, ER; Wick products of the CAR algebra; P AM MATH SOC 126: (12) 3639-3645 DEC 1998

JorgensenPublished (with G.L. Price) Extending quasi-free derivations on the CAR-algebra, \textit{J.~Operator Theory\/} \textbf{16 }(1986) 147--155. M.R. 88a:46069 [S. Sakai].


Non-Self BRATTELI, O;TI DERIVATIONS, DISSIPATIONS AND GROUP-ACTIONS ON C-STAR-ALGEBRAS;SO LECTURE NOTES IN MATHEMATICS;BP 1;EP 274;PG 274;JI Lect. Notes Math.;PY 1986;VL 1229;GA F9401;J9 LECT NOTE MATH;UT ISI:A1986F940100001;


JorgensenPublished (with L.M. Schmitt and R.F. Werner) $q$-canonical commutation relations and stability of the Cuntz algebra, \textit{Pacific J.\ Math.}\ \textbf{165} (1994) 131--151. M.R. 95g:46116 [Roland Speicher].


Non-Self Borowiec, A; Marcinek, W;TI On crossed product of algebras;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 6959;EP 6975;PG 17;JI J. Math. Phys.;PY 2000;PD OCT;VL 41;IS 10;GA 357XA;J9 J MATH PHYS-NY;UT ISI:000089525000019;

Non-Self Bozejko, M; Kummerer, B; Speicher, R;TI q-Gaussian processes: Non-commutative and classical aspects;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 129;EP 154;PG 26;JI Commun. Math. Phys.;PY 1997;PD APR;VL 185;IS 1;GA WY165;J9 COMMUN MATH PHYS;UT ISI:A19


Non-Self BOZEJKO, M; SPEICHER, R;TI COMPLETELY POSITIVE MAPS ON COXETER GROUPS, DEFORMED; COMMUTATION RELATIONS, AND OPERATOR-SPACES;SO MATHEMATISCHE ANNALEN;BP 97;EP 120;PG 24;JI Math. Ann.;PY 1994;PD SEP;VL 300;IS 1;GA PJ561;J9 MATH ANN;UT ISI:A1994PJ5610000

Non-Self Chung, WS; Klimyk, AU;TI On position and momentum operators in the q-oscillator algebra;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 917;EP 932;PG 16;JI J. Math. Phys.;PY 1996;PD FEB;VL 37;IS 2;GA TT400;J9 J MATH PHYS-NY;UT ISI:A1996TT40000023;

Non-Self DYKEMA, K; NICA, A;TI ON THE FOCK REPRESENTATION OF THE Q-COMMUTATION RELATIONS;SO JOURNAL FUR DIE REINE UND ANGEWANDTE MATHEMATIK;BP 201;EP 212;PG 12;JI J. Reine Angew. Math.;PY 1993;VL 440;GA LQ487;J9 J REINE ANGEW MATH;UT ISI:A1993LQ48700009;

Non-Self Kaminker, J; Putnam, I;TI K-theoretic duality for shifts of finite type;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 509;EP 522;PG 14;JI Commun. Math. Phys.;PY 1997;PD AUG;VL 187;IS 3;GA XV312;J9 COMMUN MATH PHYS;UT ISI:A1997XV31200002;

Non-Self Katayama, Y; Matsumoto, K; Watatani, Y;TI Simple C*-algebras arising from beta-expansion of real numbers;SO ERGODIC THEORY AND DYNAMICAL SYSTEMS;BP 937;EP 962;PG 26;JI Ergod. Theory Dyn. Syst.;PY 1998;PD AUG;VL 18;PN 4;GA 123LN;J9 ERGOD THEOR DYN SYST

Non-Self Lust-Piquard, F;TI Riesz transforms on deformed Fock spaces;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 519;EP 549;PG 31;JI Commun. Math. Phys.;PY 1999;PD SEP;VL 205;IS 3;GA 240YW;J9 COMMUN MATH PHYS;UT ISI:000082855200002;

Non-Self MAXIMOV, V; ODZIJEWICZ, A;TI THE Q-DEFORMATION OF QUANTUM-MECHANICS OF ONE DEGREE-OF-FREEDOM;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 1681;EP 1690;PG 10;JI J. Math. Phys.;PY 1995;PD APR;VL 36;IS 4;GA QQ234;J9 J MATH PHYS-NY;UT ISI:A1995QQ23400012;

Non-Self McAnally, DS; Tsohantjis, I;TI Deformed boson algebras and the quantum double construction;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 651;EP 659;PG 9;JI J. Phys. A-Math. Gen.;PY 1997;PD JAN 21;VL 30;IS 2;GA WG344;J9 J PHYS-A-MATH GEN;UT ISI:A19

Non-Self Meljanac, S; Milekovic, M;TI A unified view of multimode algebras with fock-like; representations;SO INTERNATIONAL JOURNAL OF MODERN PHYSICS A;BP 1391;EP 1412;PG 22;JI Int. J. Mod. Phys. A;PY 1996;PD MAR 30;VL 11;IS 8;GA UA670;J9 INT J MOD PHYS A;UT I

Non-Self MOLLER, JS;TI 2ND QUANTIZATION IN A QUON-ALGEBRA;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 4643;EP 4652;PG 10;JI J. Phys. A-Math. Gen.;PY 1993;PD SEP 21;VL 26;IS 18;GA LZ931;J9 J PHYS-A-MATH GEN;UT ISI:A1993LZ93100028;

Non-Self Paolucci, A; Tsohantjis, I;TI Hopf-type deformed oscillators, their quantum double and a q-; deformed Calogero-Vasiliev algebra;SO PHYSICS LETTERS A;BP 27;EP 34;PG 8;JI Phys. Lett.


Non-Self SCHMUDGEN, K;TI OPERATOR REPRESENTATIONS OF THE REAL TWISTED CANONICAL; COMMUTATION RELATIONS;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 3211;EP 3229;PG 19;JI J. Math. Phys.;PY 1994;PD JUN;VL 35;IS 6;GA NP302;J9 J MATH PHYS-NY;UT ISI:A1994NP30200039;


Non-Self Tsohantjis, I; Paolucci, A; Jarvis, PD;TI On boson algebras as Hopf algebras;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 4075;EP 4087;PG 13;JI J. Phys. A-Math. Gen.;PY 1997;PD JUN 7;VL 30;IS 11;GA XE208;J9 J PHYS-A-MATH GEN;UT ISI:A1997XE20800

Non-Self Ueda, Y; Watatani, Y;TI A relation between certain interpolated Cuntz algebras and; interpolated free group factors;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 1397;EP 1404;PG 8;JI Proc. Amer. Math. Soc.;PY 2000;VL 128;IS 5;GA 291GM;J9 PROC

Non-Self vanLeeuwen, H; Maassen, H;TI An obstruction for q-deformation of the convolution product;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 4741;EP 4748;PG 8;JI J. Phys. A-Math. Gen.;PY 1996;PD AUG 7;VL 29;IS 15;GA VC648;J9 J PHYS-A-MATH GEN;UT ISI:A19

Non-Self WERNER, RF;TI THE FREE QUON GAS SUFFERS GIBBS PARADOX;SO PHYSICAL REVIEW D;BP 2929;EP 2934;PG 6;JI Phys. Rev. D;PY 1993;PD SEP 15;VL 48;IS 6;GA LY666;J9 PHYS REV D;UT ISI:A1993LY66600057;

Self (with D.P. Proskurin and Yu.\ S. Samo\u{\i}lenko) The kernel of Fock representations of Wick algebras with braided operator of coefficients (\TeX \ manuscript, 14 pages), \textit{Pacific J.\ Math}., to appear. \newline http://arXiv.org/abs/math-ph/0001011



Self (with O.~Bratteli and D.E.~Evans) Compactly supported wavelets and representations of the Cuntz relations, \textit{Applied and Computational Harmonic Analysis} \textbf{8} (2000), 166--196. \newline http://arXiv.org/abs/math.FA/9912129


JorgensenPublished (with L.M. Schmitt and R.F. Werner) $q$-relations and stability of $C^{\ast}$-iso\-mor\-phism classes, \textit{Algebraic methods in operator theory} (R.E. Curto and P.E.T. Jorgensen, eds.), Birkh\"{a}user, Boston, 1994, pp.\ 261--271. M.R. 95g:46115 [Rola


Non-Self Gabardo, JP;TI Nonuniform multiresolution analyses and spectral pairs;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 209;EP 241;PG 33;JI J. Funct. Anal.;PY 1998;PD SEP 10;VL

Non-Self Lagarias, JC; Wang, Y;TI Spectral sets and factorizations of finite Abelian groups;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 73;EP 98;PG 26;JI J. Funct. Anal.;PY 1997;PD APR 1;VL


Self (with S. Pedersen) Harmonic analysis and fractal limit-measures induced by representations of a certain $C^{\ast}$-algebra, \textit{J.~Funct.\ Anal.}% \ \textbf{125} (1994), 90--110. M.R. 95i:47067 [Paul Jolissaint].


(with R.F. Werner) Coherent states of the $q$-canonical commutation relations, \textit{Comm.\ Math.\ Phys.}\ \textbf{164 }(1994), 455--471. M.R. 95k:81071 [Ken Dykema]. \newline http://arXiv.org/abs/funct-an/9303002

(with S.~Pedersen) Spectral pairs in Cartesian coordinates, \textit{Journal of Fourier Analysis and Applications} \textbf{5} (1999), 289--306. \newline http://arXiv.org/abs/math.FA/9912131


Self (with S. Pedersen) Harmonic analysis of fractal measures, \textit{Constr.\ Approx.}\ \textbf{12} (1996), 1--30. M.R. 97c:46091 [Paul Jolissaint].\newline http://www.math.uiowa.edu/ftp/jorgen/0720941.ps.gz

Self (with S.~Pedersen) Dense analytic subspaces in fractal $L^{2}$-spaces, \textit{Journal d'Analyse Math\'{e}matique} \textbf{75} (1998), 185--228. M.R. 2000a:46045 [Javier Soria, who also

Non-Self Gabardo, JP;TI Hilbert spaces of distributions having an orthogonal basis of; exponentials;SO JOURNAL OF FOURIER ANALYSIS AND APPLICATIONS;BP 277;EP 298;PG 22;JI J. Fourier Anal. Appl.;PY 2000;VL 6;IS 3;GA 308TH;J9 J FOURIER ANAL APPL;UT ISI:00008672860

Non-Self Lagarias, JC; Wang, Y;TI Tiling the line with translates of one tile;SO INVENTIONES MATHEMATICAE;BP 341;EP 365;PG 25;JI Invent. Math.;PY 1996;PD FEB;VL 124;IS 1-3;GA TR933;J9 INVENT MATH;UT ISI:A1996TR93300013;

Non-Self Lagarias, JC; Reeds, JA; Wang, Y;TI Orthonormal bases of exponents for the n-cube;SO DUKE MATHEMATICAL JOURNAL;BP 25;EP 37;PG 13;JI Duke Math. J.;PY 2000;PD MAY 15;VL

JorgensenPublished (with L.M. Schmitt and R.F. Werner) Positive representations of general commutation relations allowing Wick ordering, \textit{J.~Funct.\ Anal.}% \ \textbf{134} (1995), 33--99. M.R. 96h:81033 [W\l adys\l aw Adam Majewski]. \newline http://arXiv.org/abs/fun


Non-Self Hannabuss, KC;TI Bilinear forms, clifford algebras, q-commutation relations, and; quantum groups;SO JOURNAL OF ALGEBRA;BP 227;EP 256;PG 30;JI J. Algebra;PY 2000;PD JUN


Non-Self Krolak, N;TI Wick product for commutation relations connected with Yang-; Baxter operators and new constructions of factors;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 685;EP 701;PG 17;JI Commun. Math. Phys.;PY 2000;PD APR;VL 210;IS 3;GA 311JR;J9 COMMU

Self (with D.P. Proskurin and Yu.\ S. Samo\u{\i}lenko) The kernel of Fock representations of Wick algebras with braided operator of coefficients (\TeX \ manuscript, 14 pages), \textit{Pacific J.\ Math}., to appear. \newline http://arXiv.org/abs/math-ph/0001011

Non-Self McAnally, DS; Tsohantjis, I;TI Deformed boson algebras and the quantum double construction;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 651;EP 659;PG 9;JI J. Phys. A-Math. Gen.;PY 1997;PD JAN 21;VL 30;IS 2;GA WG344;J9 J PHYS-A-MATH GEN;UT ISI:A19


Ralowski, R;TI On Wick algebras with additional twisted commutation relations;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 3235;EP 3247;PG 13;JI J. Phys. A-Math. Gen.;PY 1997;PD MAY 7;VL 30;IS 9;GA WZ932;J9 J PHYS-A-MATH GEN;UT ISI:A1997WZ93200029;

Non-Self Green, G;TI Howe duality for the quantum groups U(q)u(m,n), U(q)u(M);SO JOURNAL OF MATHEMATICAL PHYSICS;BP 1074;EP 1086;PG 13;JI J. Math. Phys.;PY 1999;PD FEB;VL

Non-Self Proskurin, D;TI Homogeneous ideals in Wick *-algebras;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 3371;EP 3376;PG 6;JI Proc. Amer. Math. Soc.;PY 1998;PD NOV;VL 126;IS 11;GA 130EV;J9 PROC AMER MATH SOC;UT ISI:000076507700033;


MARCINEK, W;TI ON COLOR QUANTIZATION - RELATIONS AND PARASTATISTICS;SO INTERNATIONAL JOURNAL OF MODERN PHYSICS A;BP 1465;EP 1481;PG 17;JI Int. J. Mod. Phys. A;PY 1995;PD APR 20;VL 10;IS 10;GA QT188;J9 INT J MOD PHYS A;UT ISI:A1995QT18800004;

Non-Self Marcinek, W;TI Particles in singular magnetic field;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 818;EP 830;PG 13;JI J. Math. Phys.;PY 1998;PD FEB;VL 39;IS 2;GA YU721;J9 J MATH PHYS-NY;UT ISI:000071747600010;

Tsohantjis, I; Paolucci, A; Jarvis, PD;TI On boson algebras as Hopf algebras;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 4075;EP 4087;PG 13;JI J. Phys. A-Math. Gen.;PY 1997;PD JUN 7;VL 30;IS 11;GA XE208;J9 J PHYS-A-MATH GEN;UT ISI:A1997XE20800

Non-Self Bozejko, M; Kummerer, B; Speicher, R;TI q-Gaussian processes: Non-commutative and classical aspects;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 129;EP 154;PG 26;JI Commun. Math. Phys.;PY 1997;PD APR;VL 185;IS 1;GA WY165;J9 COMMUN MATH PHYS;UT ISI:A19

Non-Self MARCINEK, W; RALOWSKI, R;TI ON WICK ALGEBRAS WITH BRAID RELATIONS;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 2803;EP 2812;PG 10;JI J. Math. Phys.;PY 1995;PD JUN;VL 36;IS 6;GA RB008;J9 J MATH PHYS-NY;UT ISI:A1995RB00800018;

Non-Self Meljanac, S; Milekovic, M; Stojic, M;TI Exclusion statistics, operator algebras and Fock space; representations;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 1115;EP 1130;PG 16;JI J. Phys. A-Math. Gen.;PY 1999;PD FEB 19;VL 32;IS 7;GA 170RA;J9

Self A duality for endomorphisms of von Neumann algebras, \textit{J.~Math.\ Phys.}\ \textbf{37}

http://www.math.uiowa.edu/ftp/jorgen/duality\_endomorphisms.ps.gz


Non-Self BOZEJKO, M; SPEICHER, R;TI COMPLETELY POSITIVE MAPS ON COXETER GROUPS, DEFORMED; COMMUTATION RELATIONS, AND OPERATOR-SPACES;SO MATHEMATISCHE ANNALEN;BP 97;EP 120;PG 24;JI Math. Ann.;PY 1994;PD SEP;VL 300;IS 1;GA PJ561;J9 MATH ANN;UT ISI:A1994PJ5610000




Non-Self Borowiec, A; Marcinek, W;TI On crossed product of algebras;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 6959;EP 6975;PG 17;JI J. Math. Phys.;PY 2000;PD OCT;VL 41;IS 10;GA 357XA;J9 J MATH PHYS-NY;UT ISI:000089525000019;

Non-Self Marcinek, W;TI On commutation relations for quons;SO REPORTS ON MATHEMATICAL PHYSICS;BP 155;EP 172;PG 18;JI Rep. Math. Phys.;PY 1998;PD APR;VL 41;IS 2;GA 200HC;J9 REP MATH PHYS;UT ISI:000080532700002;

Self (with O. Bratteli) Endomorphisms of $\mathcal{B}\left( \mathcal{H}% \right) $, II: Finitely correlated states on $\mathcal{O}_{N}$, \textit{J.~Funct.\ Anal.}\ \textbf{145} (1997), 323--373. M.R. 98c:46128 [Steve Wright].\newline http://www.math.uiowa.ed

JorgensenPublished (with O. Bratteli and F. Goodman) Unbounded derivations tangential to compact groups of automorphisms II, \textit{J.~Funct.\ Anal.}\ \textbf{61} (1985) 247--289. M.R. 87h:46130 [S. Sakai].


Non-Self Batty, C. J. K.; Kishimoto, A. Derivations and one-parameter subgroups of $C\sp *$-dynamical systems. J. London Math. Soc. (2) 31 (1985), no. 3, 526--536.

Non-Self Bratteli, Ola(3-OTTW); Elliott, George A.(3-OTTW); Evans, David E.(3-OTTW) Locality and differential operators on $C\sp *$-algebras. J. Differential Equations 64 (1986), no. 2, 221--273.


Non-Self Bratteli, Ola; Digernes, Trond; Elliott, George A. Locality and differential operators on $C\sp *$-algebras. II. Operator algebras and their connections with topology and ergodic theory (Bu\c steni, 1983), 46--83, Lecture Notes in Math., 1132, Springer, B

Non-Self Bratteli, Ola; Evans, David E. Derivations tangential to compact groups: the nonabelian case. Proc. London Math. Soc. (3) 52 (1986), no. 2, 369--384.


Non-Self Kurose, Hideki Perturbations and ground states of $C\sp *$-dynamical systems. Proc. Amer. Math. Soc. 95 (1985), no. 2, 242--246.

Thomsen, Klaus; Comment on: Bratteli, Ola; Goodman, Frederick M.; Jørgensen, Palle E. T. Unbounded derivations tangential to compact groups of automorphisms. II. (in same issue) J. Funct. Anal. 61 (1985), no. 3, 290--294.

JorgensenPublished (with O. Bratteli and G. Elliott) Decomposition of unbounded derivations into invariant and approximately inner parts, \textit{J.~Reine Angew.\ Math.}% \ \textbf{346 }(1984), 166--193. Z.M. 46055 [B.D. Malviya]; M.R. 85j:46106 [S. Sakai].


Non-Self Arveson, W., Price, G., The structure of spin systems, preprint 2000


Non-Self Batty, C. J. K.; Kishimoto, A. Derivations and one-parameter subgroups of $C\sp *$-dynamical systems. J. London Math. Soc. (2) 31 (1985), no. 3, 526--536.


Non-Self Bratteli, Ola; Digernes, Trond; Goodman, Frederick; Robinson, Derek W. Integration in abelian $C\sp *$-dynamical systems. Publ. Res. Inst. Math. Sci. 21 (1985), no. 5, 1001--1030.


Non-Self Bratteli, Ola On dynamical semigroups and compact group actions. Quantum probability and applications to the quantum theory of irreversible processes (Villa Mondragone, 1982), 46--61, Lecture Notes in Math., 1055, Springer, Berlin-New York, 1984.




(with F.M. Goodman and C. Peligrad) Smooth derivations commuting with Lie group actions, \textit{Math.\ Proc.\ Cambridge Philos.\ Soc.}\ \textbf{99 }(1986) 307--314. M.R. 87d:46077 [C.J.K. Batty].




JorgensenPublished (with O. Bratteli and G. Price) Endomorphisms of $\mathcal{B}% (\mathcal{H})$, \textit{Quantization, Nonlinear Partial Differential Equations, and Operator Algebra} (Cambridge,


Non-Self Gohm, Rolf; Coupling representations for endomorphisms of $B(H)$, Preprint-Reihe Mathematik 12/99, Ernst-Moritz-Arndt-Universität Greifswald.

JorgensenPublished (with O. Bratteli) Conservative derivations and dissipative Laplacians, \textit{J.~Funct.\ Anal.}\ \textbf{82 }(1989) 404--411. M.R. 90d:46089 [C.J.K. Batty].


Non-Self ROBINSON, DW; THE HEAT SEMIGROUP AND INTEGRABILITY OF LIE-ALGEBRAS - LIPSCHITZ-SPACES AND SMOOTHNESS PROPERTIES; COMMUN MATH PHYS 132: (1) 217-243 1990

JorgensenPublished (with O. Bratteli) Derivations commuting with abelian gauge actions on lattice systems, \textit{Comm.\ Math.\ Phys.}\ \textbf{87 }(1982) 353--364. M.R. 84i:46066 [D.W. Robinson].





Bratteli, Ola; Elliott, George A.; Robinson, Derek W. The characterization of differential operators by locality: dissipations and ellipticity. Publ. Res. Inst. Math. Sci. 21 (1985), no. 5, 1031--1049.




Goodman, Frederick M.; Wassermann, Antony J. Unbounded derivations commuting with compact

Non-Self Longo, Roberto; Peligrad, Costel Noncommutative topological dynamics and compact actions on

Non-Self Price, Geoffrey L. On some nonextendable derivations of the gauge-invariant CAR algebra. Trans. Amer. Math. Soc. 285 (1984), no. 1, 185--201.



JorgensenPublished (with O. Bratteli) Endomorphisms of $\mathcal{B}\left( \mathcal{H}% \right) $, II: Finitely correlated states on $\mathcal{O}_{N}$, \textit{J.~Funct.\ Anal.}\ \textbf{145} (1997), 323--373. M.R. 98c:46128 [Steve Wright].\newline http://www.math.uiowa.ed


Non-Self Bratteli, O; Kishimoto, A; Homogeneity of the pure state space of the Cuntz algebra; J FUNCT ANAL 171: (2) 331-345 MAR 10 2000

Jeong, EC; Irreducible representations of the Cuntz algebra O-N; P AM MATH SOC 127: (12) 3583-3590 DEC 1999

Non-Self Matsui, T; A characterization of pure finitely correlated states; INFIN DIMENS ANAL QU 1: (4) 647-661 OCT 1998

Non-Self Popescu, G; Noncommutative joint dilations and free product operator algebras; PAC J MATH 186: (1) 111-140 NOV 1998

Non-Self Fowler, NJ; Laca, M; Endomorphisms of B(H), extensions of pure states, and a class of representations of O-n; J OPERAT THEOR 44: (1) 113-138 SUM 2000


Self \label{MR99k:46094a}(with O.~Bratteli) Iterated function systems and permutation representations of the Cuntz algebra, \textit{Mem.\ Amer.\ Math.\ Soc.}\ \textbf{139} (1999), no.~663. M.R. 99k:46094a [``Featured Review'' by Paul Jolissaint, with paper no.

Non-Self Fowler, NJ; States of Toeplitz-Cuntz algebras; J OPERAT THEOR 42: (1) 121-144 SUM 1999

Self (with O.~Bratteli, A.~Kishimoto, and R.F.~Werner) Pure states on $\mathcal{O}_{d}$, \textit{J.~Operator Theory} \textbf{43} (2000), 97--143. \newline http://arXiv.org/abs/funct-an/9711004


(with O. Bratteli) Positive semigroups of operators, and applications: Editors' Introduction, \textit{Acta Appl.\ Math.}\ \textbf{2 }(1984) 213--219.



JorgensenPublished (with O. Bratteli) Unbounded *-derivations and infinitesimal generators on operator algebras, in Proceedings of the AMS\ Summer Institute on Operator Algebras, Kingston, Ontario, 1980,



(with O. Bratteli) Unbounded derivations tangential to compact groups of automorphisms, \textit{J.~Funct.\ Anal.}\ \textbf{48 }(1982) 107--133. M.R. 84b:46073 [S. Sakai].

Self (with O. Bratteli, A. Kishimoto, and D.W. Robinson) A $C^{\ast}% $-algebraic Schoenberg theorem, \textit{Ann.\ Inst.\ Fourier (Grenoble)} \textbf{34} (1984) 155--187. M.R. 86b:46105 [J.P. Sproston].

Self Compact symmetry groups and generators for sub-Markovian semigroups, \textit{Z.~Wahr\-schein\-lich\-keits\-the\-o\-rie und Verw.\ Gebiete\/} \textbf{63 }(1983) 17--27. M.R. 84e:47055 [F.~Hirsch].

JorgensenPublished (with O. Bratteli) Unbounded derivations tangential to compact groups of automorphisms, \textit{J.~Funct.\ Anal.}\ \textbf{48 }(1982) 107--133. M.R. 84b:46073 [S. Sakai].


Non-Self Batty, C. J. K. Local operators and derivations on $C\sp *$-algebras. Trans. Amer. Math. Soc. 287 (1985), no. 1, 343--352.



Non-Self Bratteli, Ola; Digernes, Trond; Elliott, George A. Locality and differential operators on $C\sp *$-algebras. II. Operator algebras and their connections with topology and ergodic theory (Bu\c steni, 1983), 46--83, Lecture Notes in Math., 1132, Springer, B

Non-Self Bratteli, Ola; Digernes, Trond; Robinson, Derek W. Relative locality of derivations. J. Funct. Anal. 59 (1984), no. 1, 12--40.




Goodman, Frederick M.; Wassermann, Antony J. Unbounded derivations commuting with compact


Non-Self Ikunishi, Akio; Derivations in $C\sp{*} $-algebras commuting with compact actions. Publ. Res. Inst. Math. Sci. 19 (1983), no. 1, 99--106.

Non-Self Kishimoto, Akitaka; Robinson, Derek W. Derivations, dynamical systems, and spectral restrictions. Math. Scand. 56 (1985), no. 1, 83--95.

Longo, Roberto; Peligrad, Costel Noncommutative topological dynamics and compact actions on


Non-Self Peligrad, C. Derivations of $C^*$-algebras which are invariant under an automorphism group. II. Invariant subspaces and other topics (Timi\cedla soara/Herculane, 1981), pp. 181--194, Operator Theory: Adv. Appl., 6, Birkhäuser, Basel-Boston, Mass., 1982.

Non-Self Price, Geoffrey L. On derivations annihilating a maximal abelian subalgebra. Trans. Amer. Math. Soc. 290 (1985), no. 2, 843--850.

Price, Geoffrey L. On some nonextendable derivations of the gauge-invariant CAR algebra. Trans. Amer. Math. Soc. 285 (1984), no. 1, 185--201.

Self (with F.M. Goodman and C. Peligrad) Smooth derivations commuting with Lie group actions, \textit{Math.\ Proc.\ Cambridge Philos.\ Soc.}\ \textbf{99 }(1986) 307--314. M.R. 87d:46077 [C.J.K. Batty].


Self (with O. Bratteli and G. Elliott) Decomposition of unbounded derivations into invariant and approximately inner parts, \textit{J.~Reine Angew.\ Math.}% \ \textbf{346 }(1984), 166--193. Z.M. 46055 [B.D. Malviya]; M.R. 85j:46106 [S. Sakai].

Self (with O. Bratteli) Derivations commuting with abelian gauge actions on lattice systems, \textit{Comm.\ Math.\ Phys.}\ \textbf{87 }(1982) 353--364. M.R. 84i:46066 [D.W. Robinson].

Self (with O. Bratteli, A. Kishimoto, and D.W. Robinson) A $C^{\ast}% $-algebraic Schoenberg theorem, \textit{Ann.\ Inst.\ Fourier (Grenoble)} \textbf{34} (1984) 155--187. M.R. 86b:46105 [J.P. Sproston].


JorgensenPublished (with O. Bratteli, A. Kishimoto, and D.W. Robinson) A $C^{\ast}% $-algebraic Schoenberg theorem, \textit{Ann.\ Inst.\ Fourier (Grenoble)} \textbf{34} (1984) 155--187. M.R. 86b:46105 [J.P. Sproston].


Non-Self BRATTELI, O; ELLIOTT, GA; ROBINSON, DW; STRONG TOPOLOGICAL TRANSITIVITY AND C-STAR-DYNAMICAL SYSTEMS, J MATH JPN 37 115 85

Non-Self Bratteli, Ola On dynamical semigroups and compact group actions. Quantum probability and applications to the quantum theory of irreversible processes (Villa Mondragone, 1982), 46--61, Lecture Notes in Math., 1055, Springer, Berlin-New York, 1984.

Non-Self Bratteli, Ola(3-OTTW); Elliott, George A.(3-OTTW); Evans, David E.(3-OTTW) Locality and differential operators on $C\sp *$-algebras. J. Differential Equations 64 (1986), no. 2, 221--273.



Bratteli, Ola; Digernes, Trond; Robinson, Derek W. Relative locality of derivations. J. Funct. Anal. 59 (1984), no. 1, 12--40.

Non-Self Bratteli, Ola; Evans, David E. Derivations tangential to compact groups: the nonabelian case. Proc. London Math. Soc. (3) 52 (1986), no. 2, 369--384.




Kishimoto, Akitaka; Robinson, Derek W. Derivations, dynamical systems, and spectral restrictions. Math. Scand. 56 (1985), no. 1, 83--95.

Kishimoto, Akitaka; Robinson, Derek W. Dissipations, derivations, dynamical systems, and asymptotic abelianness. J. Operator Theory 13 (1985), no. 2, 237--253.

Non-Self Price, Geoffrey L. On derivations annihilating a maximal abelian subalgebra. Trans. Amer. Math. Soc. 290 (1985), no. 2, 843--850.

(with O. Bratteli and F. Goodman) Unbounded derivations tangential to compact groups of automorphisms II, \textit{J.~Funct.\ Anal.}\ \textbf{61} (1985) 247--289. M.R. 87h:46130 [S. Sakai].

JorgensenPublished (with O. Bratteli, D.E. Evans, and F.M. Goodman) A dichotomy for derivations on $\mathcal{O}_{n}$, \textit{Publ.\ Res.\ Inst.\ Math.\ Sci.}% \ \textbf{22} (1986) 103--117. M.R. 87e:46082 [C.J.K. Batty].



(with S. Pedersen) Spectral theory for Borel sets in $\mathbb{R}^{n}$ of finite measure, \textit{J.~Funct.\ Anal.} \textbf{107} (1992) 72--104. M.R. 93k:47005 [R.E. Curto].

JorgensenPublished (with O. Bratteli, F. Goodman, and D. Robinson) Unitary representations of Lie groups and G\aa rding's inequality, \textit{Proc.\ Amer.\ Math.\ Soc.}% \ \textbf{107 }(1989) 627--632. M.R. 90b:22017 [G.A. Reid].


Non-Self ARENDT, W; BATTY, CJK; ROBINSON, DW;TI POSITIVE SEMIGROUPS GENERATED BY ELLIPTIC-OPERATORS ON LIE-; GROUPS;SO JOURNAL OF OPERATOR THEORY;BP 369;EP 407;PG 39;PY 1990;PD SPR;VL 23;IS 2;GA FH592;J9 J OPERAT THEOR;UT ISI:A1990FH59200007;

Non-Self ter Elst, AFM; Robinson, DW; Weighted subcoercive operators on Lie groups; J FUNCT ANAL 157: (1) 88-163 AUG 1 1998

Non-Self TERELST, AFM; ROBINSON, DW;TI SUBELLIPTIC OPERATORS ON LIE-GROUPS - REGULARITY;SO JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY SERIES A-PURE; MATHEMATICS AND STATISTICS;BP 179;EP 229;PG 51;JI J. Aust. Math. Soc. A-Pure Math. Stat.;PY 1994;PD OCT;VL

TERELST, AFM; ROBINSON, DW; SUBCOERCIVITY AND SUBELLIPTIC OPERATORS ON LIE-GROUPS .2. THE GENERAL-CASE; POTENTIAL ANAL 4: (3) 205-243 JUN 1995


TERELST, AFM; ROBINSON, DW; SUBCOERCIVITY AND SUBELLIPTIC OPERATORS ON LIE GROUPS-I - FREE NILPOTENT GROUPS; POTENTIAL ANAL 3: (3) 283-337 SEP 1994

JorgensenPublished (with O. Bratteli, F.M. Goodman, and D.W. Robinson) The heat semigroup and integrability of Lie algebras, \textit{J.~Funct.\ Anal.}\ \textbf{79 } (1988) 351--397. M.R. 90a:47105 [C.J.K. Batty].


Non-Self BRATTELI, O; KUROSE, H; ROBINSON, DW; COMPARISON OF COMMUTING 1-PARAMETER GROUPS OF ISOMETRIES; T AM MATH SOC 320: (2) 677-694 AUG 1990

Non-Self BRATTELI, O; ROBINSON, DW; 2ND-ORDER ELLIPTIC-OPERATORS AND HEAT KERNELS ON LIE-GROUPS; T AM MATH SOC 325: (2) 683-713 JUN 1991

Non-Self DAVIES, EB; POINTWISE BOUNDS ON THE SPACE AND TIME DERIVATIVES OF HEAT KERNELS; J OPERAT THEOR 21: (2) 367-378 SPR 1989

Non-Self MAGYAR, Z; HEAT KERNELS ON LIE-GROUPS; J FUNCT ANAL 93: (2) 351-390 OCT 15 1990

Non-Self ROBINSON, DW; ELLIPTIC DIFFERENTIAL-OPERATORS ON LIE-GROUPS; J FUNCT ANAL 97: (2) 373-402 MAY 1 1991

Non-Self ROBINSON, DW; THE HEAT SEMIGROUP AND INTEGRABILITY OF LIE-ALGEBRAS - LIPSCHITZ-SPACES AND SMOOTHNESS PROPERTIES; COMMUN MATH PHYS 132: (1) 217-243 1990

Non-Self ROBINSON, DW;TI LIPSCHITZ OPERATORS;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 179;EP 211;PG 33;JI J. Funct. Anal.;PY 1989;PD JUL;VL 85;IS 1;GA AJ146;J9 J FUNCT ANAL;UT ISI:A1989AJ14600006;

(with O. Bratteli) Conservative derivations and dissipative Laplacians, \textit{J.~Funct.\ Anal.}\ \textbf{82 }(1989) 404--411. M.R. 90d:46089 [C.J.K. Batty].

JorgensenPublished (with O. Bratteli, G. Elliott, and F. Goodman) On Lie algebras of operators, \textit{J.~Funct.\ Anal.}\ \textbf{86} (1989) 341--359. M.R. 90j:46056 [C.J.K. Batty].


Non-Self Bennett, CD;TI Exponentiation of infinite dimensional Z-graded Lie algebras;SO COMMUNICATIONS IN ALGEBRA;BP 4013;EP 4036;PG 24;JI Commun. Algebr.;PY 2000;VL 28;IS 9;GA 341JQ;J9 COMMUN ALGEBRA;UT ISI:000088587600001;

JorgensenPublished (with O.~Bratteli, A.~Kishimoto, and R.F.~Werner) Pure states on $\mathcal{O}_{d}$, \textit{J.~Operator Theory} \textbf{43} (2000), 97--143. \newline http://arXiv.org/abs/funct-an/9711004



JorgensenPublished (with P. Muhly and K.-S. Saito) Scattering theory and crossed products of von Neumann algebras, preprint 1986, Univ.\ of Iowa, under revision.


Self Spectral theory for one-parameter groups of isometries, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{168} (1992) 131--146. M.R. 93e:47048 [A.I. Shtern].


JorgensenPublished (with P.S. Muhly) Self adjoint extensions satisfying the Weyl operator commutation relations, \textit{J.~Analyse Math.}\ \textbf{37} (1980) 46--99. M.R. 82k:47058 [S. Kantorovitz].


Non-Self KISSIN, E;TI DISSIPATIVE IMPLEMENTATIONS OF STAR-DERIVATIONS OF C-STAR-; ALGEBRAS AND REPRESENTATIONS IN INDEFINITE METRIC-SPACES;SO JOURNAL OF THE LONDON MATHEMATICAL SOCIETY-SECOND SERIES;BP 451;EP 464;PG 14;JI J. Lond. Math. Soc.-Second Ser.;PY 1991;

McAsey, Michael J.; Muhly, Paul S.; Representations of nonselfadjoint crossed products. Proc. London Math. Soc. (3) 47 (1983), no. 1, 128--144.

Non-Self Nakazato, Hiroshi On left invariant dissipative operators. Arch. Math. (Basel) 45 (1985), no. 5, 458--462.

Non-Self Schmüdgen, Konrad; On domains of powers of closed symmetric operators. J. Operator Theory 9 (1983), no. 1, 53--75.

Non-Self Schmüdgen, Konrad; On the Heisenberg commutation relation. II. Publ. Res. Inst. Math. Sci. 19 (1983), no. 2, 601--671.

Non-Self Schmüdgen, Konrad; On the Heisenberg commutation relation. I. J. Funct. Anal. 50 (1983), no. 1, 8--49.

Self (with P. Muhly and K.-S. Saito) Scattering theory and crossed products of von Neumann algebras, preprint 1986, Univ.\ of Iowa, under revision.

Self A uniqueness theorem for the Heisenberg-Weyl commutation relations with non-self-adjoint position operator, \textit{Amer.\ J.\ Math.}\ \textbf{103 } (1981) 273--287. M.R. 82g:81033 [E.R. Cekanovskii].


Self Unbounded operators: Perturbations and commutativity problems, \textit{J.~Funct.\ Anal.}\ \textbf{39} (1980) 281--307. M.R. 82e:47003 [C.R. Putnam].

JorgensenPublished (with R.F. Werner) Coherent states of the $q$-canonical commutation relations, \textit{Comm.\ Math.\ Phys.}\ \textbf{164 }(1994), 455--471. M.R. 95k:81071 [Ken Dykema]. \newline http://arXiv.org/abs/funct-an/9303002

Bozejko, M; Kummerer, B; Speicher, R;TI q-Gaussian processes: Non-commutative and classical aspects;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 129;EP 154;PG 26;JI Commun. Math. Phys.;PY 1997;PD APR;VL 185;IS 1;GA WY165;J9 COMMUN MATH PHYS;UT ISI:A19

Non-Self Chung, WS; Klimyk, AU;TI On position and momentum operators in the q-oscillator algebra;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 917;EP 932;PG 16;JI J. Math. Phys.;PY 1996;PD FEB;VL 37;IS 2;GA TT400;J9 J MATH PHYS-NY;UT ISI:A1996TT40000023;

Non-Self Hannabuss, KC;TI Bilinear forms, clifford algebras, q-commutation relations, and; quantum groups;SO JOURNAL OF ALGEBRA;BP 227;EP 256;PG 30;JI J. Algebra;PY 2000;PD JUN

Non-Self Hellstrom, L; Silvestrov, SD;TI On centralisers in q-deformed Heisenberg algebras;SO CZECHOSLOVAK JOURNAL OF PHYSICS;BP 1163;EP 1169;PG 7;JI Czech. J. Phys.;PY 1997;PD NOV;VL 47;IS 11;GA YK283;J9 CZECH J PHYS;UT ISI:A1997YK28300013;


Non-Self Katriel, J; Duchamp, G;TI Ordering relations for q-boson operators, continued fraction; techniques and the q-CBH enigma;SO JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL;BP 7209;EP 7225;PG 17;JI J. Phys. A-Math. Gen.;PY 1995;PD DEC 21;VL 28;IS 24;GA TN

Non-Self Kisil, VV;TI Wavelets in Banach spaces;SO ACTA APPLICANDAE MATHEMATICAE;BP 79;EP 109;PG 31;JI Acta Appl. Math.;PY 1999;PD OCT;VL 59;IS 1;GA 272GB;J9 ACTA APPL MATH;UT ISI:000084641200004;


Non-Self Meljanac, S; Milekovic, M;TI A unified view of multimode algebras with fock-like; representations;SO INTERNATIONAL JOURNAL OF MODERN PHYSICS A;BP 1391;EP 1412;PG 22;JI Int. J. Mod. Phys. A;PY 1996;PD MAR 30;VL 11;IS 8;GA UA670;J9 INT J MOD PHYS A;UT I

Non-Self Odzijewicz, A;TI Quantum algebras and q-special functions related to coherent; states maps of the disc;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 183;EP 215;PG 33;JI Commun. Math. Phys.;PY 1998;PD MAR;VL 192;IS 1;GA ZD168;J9 COMMUN MATH PHYS;UT ISI:00



Non-Self Vollbrecht, KGH; Werner, RF;TI Why two qubits are special;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 6772;EP 6782;PG 11;JI J. Math. Phys.;PY 2000;PD OCT;VL 41;IS 10;GA 357XA;J9 J MATH PHYS-NY;UT ISI:000089525000006;

Non-Self WERNER, RF;TI THE FREE QUON GAS SUFFERS GIBBS PARADOX;SO PHYSICAL REVIEW D;BP 2929;EP 2934;PG 6;JI Phys. Rev. D;PY 1993;PD SEP 15;VL 48;IS 6;GA LY666;J9 PHYS REV D;UT ISI:A1993LY66600057;

Non-Self Xia, DX;TI Generalized cyclic cohomology associated with deformed; commutators;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 1743;EP 1753;PG 11;JI Proc. Amer. Math. Soc.;PY 1996;PD JUN;VL 124;IS 6;GA UW734;J9 PROC AMER MATH SOC;UT ISI:A1996UW73




Self Harmonic analysis of fractal processes via $C^{\ast}$-algebras, \textit{Math.\ Nach}.\ \textbf{200} (1999), 77--117. http://arXiv.org/abs/funct-an/9612006


JorgensenPublished


Non-Self Schmüdgen, Konrad On commuting unbounded selfadjoint operators. I. Acta Sci. Math. (Szeged) 47 (1984), no. 1-2, 131--146.

Non-Self Schmüdgen, Konrad(DDR-KMU) On commuting unbounded selfadjoint operators. III. Manuscripta Math. 54 (1985), no. 1-2, 221--247.

JorgensenPublished (with R.T. Powers) Positive elements in the algebra of the quantum problem of moments, \textit{Probab.\ Theory Related Fields\/} (formerly \textit{Z.F.\ Wahrschth.}) \textbf{89} (1991) 131--139. M.R. 92k:47090 [G. Epifanio].

ZEITSCHRIFT;BP 623;EP 650;PG 28;JI Math. Z.;PY 1991;VL 206;IS 4;GA FJ362;J9 MATH Z;UT ISI:A1991FJ36200012;

Non-Self XIA, JB;TI ON THE SPECTRA OF SCHRODINGER-OPERATORS;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 619;EP 645;PG 27;JI Commun. Math. Phys.;PY 1994;PD JAN;VL 159;IS 3;GA MV911;J9 COMMUN MATH PHYS;UT ISI:A1994MV91100011;


Self Off-diagonal terms in symmetric operators, \textit{J.~Math.\ Phys}.\ \textbf{41} (2000), 2337--2349\newline http://arXiv.org/abs/math-ph/9911017


JorgensenPublished (with S. Pedersen) An algebraic spectral problem for $L^{2}(\Omega)$, $\Omega\subset\mathbb{R}^{n}$ [Sur un probl\`{e}me spectral alg\'{e}brique], \textit{C.R.\ Acad.\ Sci.\ Paris Ser.\ I Math.}\ \textbf{312} (1991) 495--498. M.R. 92b:47043.



Non-Self Pedersen, S;TI Spectral sets whose spectrum is a lattice with a base;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 496;EP 509;PG 14;JI J. Funct. Anal.;PY 1996;PD NOV 1;VL


Self (with S. Pedersen) Spectral theory for Borel sets in $\mathbb{R}^{n}$ of finite measure, \textit{J.~Funct.\ Anal.} \textbf{107} (1992) 72--104. M.R. 93k:47005 [R.E. Curto].




Self (with S.~Pedersen) Spectral pairs in Cartesian coordinates, \textit{Journal of Fourier Analysis and Applications} \textbf{5} (1999), 289--306. \newline http://arXiv.org/abs/math.FA/9912131

Self (with S. Pedersen) Harmonic analysis of fractal measures induced by representations of a certain $C^{\ast}$-algebra, \textit{Bull.\ Amer.\ Math.\ Soc.\ }\textbf{29} (1993) 228--234. M.R. 94b:46094. \newline http://arXiv.org/abs/math.OA/9310233


JorgensenPublished (with S. Pedersen) Estimates on the spectrum of fractals arising from affine iterations, \textit{Fractal geometry and stochastics} (Finsterbergen, Germany, 1994) (C.~Bandt, S.~Graf, and







JorgensenPublished (with S. Pedersen) Harmonic analysis and fractal limit-measures induced by representations of a certain $C^{\ast}$-algebra, \textit{J.~Funct.\ Anal.}% \ \textbf{125} (1994), 90--110. M.R. 95i:47067 [Paul Jolissaint].



Non-Self Strichartz, RS;TI Mock Fourier series and transforms associated with certain; Cantor measures;SO JOURNAL D ANALYSE MATHEMATIQUE;BP 209;EP 238;PG 30;JI J. Anal. Math.;PY 2000;VL 81;GA 357YF;J9 J ANAL MATH;UT ISI:000089529200007;

Self (with O. Bratteli) Endomorphisms of $\mathcal{B}\left( \mathcal{H}% \right) $, II: Finitely correlated states on $\mathcal{O}_{N}$, \textit{J.~Funct.\ Anal.}\ \textbf{145} (1997), 323--373. M.R. 98c:46128 [Steve Wright].\newline http://www.math.uiowa.ed



(with S.~Pedersen) Dense analytic subspaces in fractal $L^{2}$-spaces, \textit{Journal d'Analyse Math\'{e}matique} \textbf{75} (1998), 185--228. M.R. 2000a:46045 [Javier Soria, who also

Self (with S.~Pedersen) Orthogonal harmonic analysis of fractal measures, \textit{Electronic Research Announcements of the American Mathematical Society }\textbf{4} (1998), 35--42 (posted on the



Self \label{MR99k:46094b}(with O. Bratteli) Isometries, shifts, Cuntz algebras and multiresolution wavelet analysis of scale $N$, \textit{Integral Equations and Operator Theory} \textbf{28} (1997), 382--443. M.R. 99k:46094b [``Featured Review'' by Paul Jolissa




JorgensenPublished (with S. Pedersen) Harmonic analysis of fractal measures induced by representations of a certain $C^{\ast}$-algebra, \textit{Bull.\ Amer.\ Math.\ Soc.\ }\textbf{29} (1993) 228--234. M.R. 94b:46094. \newline http://arXiv.org/abs/math.OA/9310233








JorgensenPublished (with S. Pedersen) Harmonic analysis of fractal measures, \textit{Constr.\ Approx.}\ \textbf{12} (1996), 1--30. M.R. 97c:46091 [Paul Jolissaint].\newline http://www.math.uiowa.edu/ftp/jorgen/0720941.ps.gz



Lagarias, JC; Wang, Y;TI Spectral sets and factorizations of finite Abelian groups;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 73;EP 98;PG 26;JI J. Funct. Anal.;PY 1997;PD APR 1;VL




Self (with S.~Pedersen) Orthogonal harmonic analysis and scaling of fractal measures [Analyse harmonique orthogonale des mesures fractales avec structure d'\'{e}chelle], \textit{C.~R.\ Acad.\






JorgensenPublished (with S. Pedersen) Harmonic analysis on tori, \textit{Acta Appl.\ Math.}\ \textbf{10 }(1987) 87--99. M.R. 89e:22010 [R.J. Miatello].

Gabardo, JP;TI Hilbert spaces of distributions having an orthogonal basis of; exponentials;SO JOURNAL OF FOURIER ANALYSIS AND APPLICATIONS;BP 277;EP 298;PG 22;JI J. Fourier Anal. Appl.;PY 2000;VL 6;IS 3;GA 308TH;J9 J FOURIER ANAL APPL;UT ISI:00008672860



Self (with S. Pedersen) An algebraic spectral problem for $L^{2}(\Omega)$, $\Omega\subset\mathbb{R}^{n}$ [Sur un probl\`{e}me spectral alg\'{e}brique], \textit{C.R.\ Acad.\ Sci.\ Paris Ser.\ I Math.}\ \textbf{312} (1991) 495--498. M.R. 92b:47043.


(with S. Pedersen) Harmonic analysis and fractal limit-measures induced by representations of a certain $C^{\ast}$-algebra, \textit{J.~Funct.\ Anal.}% \ \textbf{125} (1994), 90--110. M.R. 95i:47067 [Paul Jolissaint].






JorgensenPublished (with S. Pedersen) Spectral theory for Borel sets in $\mathbb{R}^{n}$ of finite measure, \textit{J.~Funct.\ Anal.} \textbf{107} (1992) 72--104. M.R. 93k:47005 [R.E. Curto].




Non-Self Gabardo, JP;TI Trigonometric moment problems for arbitrary finite subsets of; Zn;SO TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 4473;EP 4498;PG 26;JI Trans. Am. Math. Soc.;PY 1998;PD NOV;VL 350;IS 11;GA 130EW;J9 TRANS AMER MATH SOC;UT ISI:00007

Non-Self Iosevich, A; Pedersen, S;TI Spectral and tiling properties of the unit cube;SO INTERNATIONAL MATHEMATICS RESEARCH NOTICES;BP 819;EP 828;PG 10;JI Int. Math. Res. Notices;PY 1998;IS 16;GA 125FR;J9 INT MATH RES NOTICES;UT ISI:000076227200001;















JorgensenPublished (with S.\ Pedersen) Local harmonic analysis for domains in ${\mathbb{R}% }^{n}$ of finite measure, \textit{Analysis and Topology: A volume dedicated to the memory of S.~Stoilow} (C.~Andreian Cazacu, Olli E. Lehto, and T.M. Rassias, eds.), World Scientific


Non-Self Iosevich, A; Pedersen, S;TI How large are the spectral gaps?;SO PACIFIC JOURNAL OF MATHEMATICS;BP 307;EP 314;PG 8;JI Pac. J. Math.;PY 2000;PD FEB;VL 192;IS 2;GA 279PD;J9 PAC J MATH;UT ISI:000085053300008;

JorgensenPublished (with S.~Pedersen) Dense analytic subspaces in fractal $L^{2}$-spaces, \textit{Journal d'Analyse Math\'{e}matique} \textbf{75} (1998), 185--228. M.R. 2000a:46045 [Javier Soria, who also




Non-Self Iosevich, A; Pedersen, S;TI How large are the spectral gaps?;SO PACIFIC JOURNAL OF MATHEMATICS;BP 307;EP 314;PG 8;JI Pac. J. Math.;PY 2000;PD FEB;VL 192;IS 2;GA 279PD;J9 PAC J MATH;UT ISI:000085053300008;


Self A geometric approach to the cascade approximation operator for wavelets, \textit{Integral Equations Operator Theory} \textbf{35} (1999), 125--171. \newline http://arXiv.org/abs/math.FA/9912132

Strichartz, R.S., Remarks on: "Dense analytic subspaces in fractal $L\sp 2$-spaces" [J. Anal. Math. {75} (1998), 185--228; MR 2000a:46045] by P. E. T. Jorgensen and S. Pedersen. J. Anal. Math. 75 (1998), 229--231.

JorgensenPublished (with S.~Pedersen) Orthogonal harmonic analysis of fractal measures, \textit{Electronic Research Announcements of the American Mathematical Society }\textbf{4} (1998), 35--42 (posted on the



Non-Self Iosevich, A; Katz, N; Pedersen, S;TI Fourier bases and a distance problem of Erdos;SO MATHEMATICAL RESEARCH LETTERS;BP 251;EP 255;PG 5;JI Math. Res. Lett.;PY 1999;PD MAR;VL 6;IS 2;GA 213RJ;J9 MATH RES LETT;UT ISI:000081286800013;

JorgensenPublished (with S.~Pedersen) Spectral pairs in Cartesian coordinates, \textit{Journal of Fourier Analysis and Applications} \textbf{5} (1999), 289--306. \newline http://arXiv.org/abs/math.FA/9912131


Non-Self Iosevich, A; Katz, N; Pedersen, S;TI Fourier bases and a distance problem of Erdos;SO MATHEMATICAL RESEARCH LETTERS;BP 251;EP 255;PG 5;JI Math. Res. Lett.;PY 1999;PD MAR;VL 6;IS 2;GA 213RJ;J9 MATH RES LETT;UT ISI:000081286800013;

Non-Self Iosevich, A; Pedersen, S;TI Spectral and tiling properties of the unit cube;SO INTERNATIONAL MATHEMATICS RESEARCH NOTICES;BP 819;EP 828;PG 10;JI Int. Math. Res. Notices;PY 1998;IS 16;GA 125FR;J9 INT MATH RES NOTICES;UT ISI:000076227200001;

Non-Self Kolountzakis, MN;TI Packing, tiling, orthogonality and completeness;SO BULLETIN OF THE LONDON MATHEMATICAL SOCIETY;BP 589;EP 599;PG 11;JI Bull. London Math. Soc.;PY 2000;PD SEP;VL 32;PN 5;GA 353EY;J9 BULL LOND MATH SOC;UT ISI:000089262900010;







JorgensenPublished (with W.H. Klink) Quantum mechanics and nilpotent groups, I: The curved magnetic field, \textit{Publ.\ Res.\ Inst.\ Math.\ Sci.}\ \textbf{21 }(1985), 969--999. Z.M. 601:58027 [M.~Monastyrsky].


Non-Self Allen, T; Anastassiou, C; Klink, WH;TI The quartic anharmonic oscillator and its associated;

4899;PG 13;JI J. Math. Phys.;PY 1997;PD OCT;VL 38;IS 10;GA XY945;J9 J MATH PHYS-NY;

Non-Self HELFFER, B; MOHAMED, A;TI A CHARACTERIZATION OF THE ESSENTIAL SPECTRUM OF THE SCHRODINGER; OPERATOR WITH A MAGNETIC-FIELD;SO ANNALES DE L INSTITUT FOURIER;BP 95;EP 112;PG 18;JI Ann. Inst. Fourier;PY 1988;VL 38;IS 2;GA Q3805;J9 ANN INST FOURIER;UT ISI:

Non-Self HELFFER, B;TI ON A CONJECTURE OF JORGENSEN,P. AND KLINK,W.;SO PUBLICATIONS OF THE RESEARCH INSTITUTE FOR MATHEMATICAL; SCIENCES;BP 1007;EP 1013;PG 7;JI Publ. Res. Inst. Math. Sci.;PY 1987;PD DEC;VL 23;IS 6;GA N7591;J9 PUBL RES INST MATH SCI;UT ISI:A1987

INSTITUTE FOR MATHEMATICAL; SCIENCES;BP 367;EP 374;PG 8;JI Publ. Res. Inst.

Self (with W.H. Klink) Spectral transform for the sub-Laplacian on the Heisenberg group, \textit{J.~Analyse Math.}\ \textbf{50} (1988) 101--121. M.R. 89k:58276 [H.P. Jakobsen].



Second order right-invariant partial differential equations on a Lie group, \textit{J.~Math.\ Anal.\


JorgensenPublished (with W.H. Klink) Spectral transform for the sub-Laplacian on the Heisenberg group, \textit{J.~Analyse Math.}\ \textbf{50} (1988) 101--121. M.R. 89k:58276 [H.P. Jakobsen].


Non-Self Allen, T; Anastassiou, C; Klink, WH;TI The quartic anharmonic oscillator and its associated;

4899;PG 13;JI J. Math. Phys.;PY 1997;PD OCT;VL 38;IS 10;GA XY945;J9 J MATH PHYS-NY;







(with X.-C. Quan) Covariance group $C^{\ast}$-algebras and Galois correspondence, \textit{Internat.\ J.\ Math.}\ \textbf{2}(6) (1991) 673--699. M.R. 93a:46129 [Alain Valette].


Non-Self QUAN, XC;TI COMPACT QUANTUM GROUPS AND GROUP DUALITY;SO ACTA APPLICANDAE MATHEMATICAE;BP 277;EP 299;PG 23;JI Acta Appl. Math.;PY 1991;PD DEC;VL 25;IS 3;GA HU673;J9 ACTA APPL MATH;UT ISI:A1991HU67300004;

JorgensenPublished \label{FirstJointPaper}(with C. Radin) Approximately inner dynamics: An early preliminary announcement. Preprint, University of Pennsylvania, 1976, 18 pages.


Non-Self Sakai, Shôichirô; Developments in the theory of unbounded derivations in $C\sp{*} $-algebras. Operator algebras and applications, Part 2 (Kingston, Ont., 1980), pp. 309--331, Proc. Sympos. Pure Math., 38, Amer. Math. Soc., Providence, R.I., 1982.

JorgensenPublished \label{MR99k:46094b}(with O. Bratteli) Isometries, shifts, Cuntz algebras and multiresolution wavelet analysis of scale $N$, \textit{Integral Equations and Operator Theory} \textbf{28} (1997), 382--443. M.R. 99k:46094b [``Featured Review'' by Paul Jolissa


Non-Self Cnops, J; Kisil, VV; Monogenic functions and representations of nilpotent Lie groups in quantum mechanics; MATH METHOD APPL SCI 22: (4) 353-373 MAR 10 1999


Non-Self Jeong, EC; Irreducible representations of the Cuntz algebra O-N; P AM MATH SOC 127: (12) 3583-3590 DEC 1999

Non-Self Kisil, VV;TI Wavelets in Banach spaces;SO ACTA APPLICANDAE MATHEMATICAE;BP 79;EP 109;PG 31;JI Acta Appl. Math.;PY 1999;PD OCT;VL 59;IS 1;GA 272GB;J9 ACTA APPL MATH;UT ISI:000084641200004;

Self (with O.~Bratteli and D.E.~Evans) Compactly supported wavelets and representations of the Cuntz relations, \textit{Applied and Computational Harmonic Analysis} \textbf{8} (2000), 166--196. \newline http://arXiv.org/abs/math.FA/9912129

Self A geometric approach to the cascade approximation operator for wavelets, \textit{Integral Equations Operator Theory} \textbf{35} (1999), 125--171. \newline http://arXiv.org/abs/math.FA/9912132

JorgensenPublished \textit{Operators and Representation Theory: Canonical Models for Algebras of Operators Arising in Quantum Mechanics,} North-Holland Mathematics Studies, vol.\ 147, Notas de Matem\'atica, vol.\ 120, North-Holland, Amsterdam--New York, 1988. M.R. 89e:47001



Non-Self LEVYBRUHL, P;TI SCHRODINGER OPERATOR SPECTRUM WITH POLYNOMIAL POTENTIAL AND; MAGNETIC-FIELD;SO PUBLICATIONS OF THE RESEARCH INSTITUTE FOR MATHEMATICAL; SCIENCES;BP 367;EP 374;PG 8;JI Publ. Res. Inst. Math. Sci.;PY 1991;PD OCT;VL 27;IS 3;GA GQ496;J9 PU


Non-Self LEV, FM;TI RELATIVISTIC QUANTUM-MECHANICS AND ITS APPLICATIONS TO FEW-; NUCLEON SYSTEMS;SO RIVISTA DEL NUOVO CIMENTO;BP 1;EP 153;PG 153;JI Riv. Nuovo Cimento;PY 1993;VL 16;IS 2;GA LV827;J9 RIV NUOVO CIMENTO;UT ISI:A1993LV82700001;


Non-Self Inoue, A; Ogi, H;TI Regular weights on algebras of unbounded operators;SO JOURNAL OF THE MATHEMATICAL SOCIETY OF JAPAN;BP 227;EP 252;PG 26;JI J. Math. Soc. Jpn.;PY 1998;PD JAN;VL 50;IS 1;GA ZV477;J9 J MATH SOC JPN;UT ISI:000074308500013;


Non-Self OTA, S;TI A NOTE ON COMMUTATIVITY OF UNBOUNDED REPRESENTATIONS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 489;EP 493;PG 5;JI Proc. Amer. Math. Soc.;PY 1993;PD JUN;VL 118;IS 2;GA LD520;J9 PROC AMER MATH SOC;UT ISI:A1993LD52000023;

Self Unitary dilations of commutation relations associated to alternating bilinear forms, \textit{Math.~Z.} \textbf{213} (1993) 425--448. M.R. 94e:81145 [Lech Jak\'{o}bczyk].





Non-Self STRICHARTZ, RS;TI LP HARMONIC-ANALYSIS AND RADON TRANSFORMS ON THE HEISENBERG-; GROUP;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 350;EP 406;PG 57;JI J. Funct. Anal.;PY 1991;PD MAR;VL 96;IS 2;GA FG952;J9 J FUNCT ANAL;UT ISI:A1991FG95200006;

Non-Self WERNER, RF;TI DILATIONS OF SYMMETRICAL OPERATORS SHIFTED BY A UNITARY-GROUP;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 166;EP 176;PG 11;JI J. Funct. Anal.;PY 1990;PD AUG;VL 92;IS 1;GA DT493;J9 J FUNCT ANAL;UT ISI:A1990DT49300010;


Non-Self GIBILISCO, P;TI INDUCED REPRESENTATIONS OF NONLOCALLY COMPACT-GROUPS;SO MATHEMATICAL NOTES;BP 248;EP 253;PG 6;JI Math. Notes;PY 1995;PD MAR-APR;VL 57;IS 3-4;GA TJ914;J9 MATH NOTES-ENGL TR;UT ISI:A1995TJ91400004;





FEINSILVER, P;TI LIE-ALGEBRAS AND RECURRENCE RELATIONS .1.;SO ACTA APPLICANDAE MATHEMATICAE;BP 291;EP 333;PG 43;JI Acta Appl. Math.;PY 1988;PD NOV;VL 13;IS 3;GA T1270;J9 ACTA APPL MATH;UT ISI:A1988T127000003;

Non-Self MAGYAR, Z;TI ON QUOTIENT MEASURES AND INDUCED REPRESENTATIONS;SO JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS;BP 189;EP 194;PG 6;JI J. Math. Anal. Appl.;PY 1989;PD JUL;VL 141;IS 1;GA AG989;J9 J MATH ANAL APPL;UT ISI:A1989AG98900014;

Non-Self Silvestrov, SD; Turowska, LB;TI Representations of the q-deformed Lie algebra of the group of; motions of the euclidean plane;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 79;EP 114;PG

Non-Self OTA, S;TI COMMUTATIVITY OF UNBOUNDED REPRESENTATIONS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 1051;EP 1056;PG 6;JI Proc. Amer. Math. Soc.;PY 1993;PD APR;VL 117;IS 4;GA KT226;J9 PROC AMER MATH SOC;UT ISI:A1993KT22600024;


Extensions of positive definite integral kernels on the Heisenberg group, \textit{J.~Funct.\ Anal.}\ \textbf{92} (1990) 474--508. M.R. 91m:22013 [L. Corwin].


JorgensenPublished A duality for endomorphisms of von Neumann algebras, \textit{J.~Math.\ Phys.}\ \textbf{37} (1996), 1521--1538. M.R. 96m:46108 [Geoffrey Price].\newline http://www.math.uiowa.edu/ftp/jorgen/duality\_endomorphisms.ps.gz






JorgensenPublished

84h:43019 [G.L. Litvinov].





JorgensenPublished A structure theorem for Lie algebras of unbounded derivations in $C^{\ast}$-algebras \& Appendix, \textit{Compositio Math.}\ \textbf{52 }(1984) 85--98. M.R. 85j:46107 [Y. Katayama].


Non-Self Arveson, W., Price, G., The structure of spin systems, preprint 2000





JorgensenPublished A uniqueness theorem for the Heisenberg-Weyl commutation relations with non-self-adjoint position operator, \textit{Amer.\ J.\ Math.}\ \textbf{103 } (1981) 273--287. M.R. 82g:81033 [E.R. Cekanovskii].


Non-Self DUDKIN, NE; KOSHMANENKO, VD;TI COMMUTATIVE PROPERTIES OF SINGULARLY PERTURBED OPERATORS;SO THEORETICAL AND MATHEMATICAL PHYSICS;BP 133;EP 143;PG 11;JI Theor. Math. Phys.;PY 1995;PD FEB;VL 102;IS 2;GA RQ888;J9 THEOR MATH PHYS-ENGL TR;UT ISI:A1995RQ888000

Existence of smooth solutions to the classical moment problems, \textit{Trans.\ Amer.\ Math.\ Soc.}\ \textbf{332} (1992) 839--848. M.R. 92j:44005 [T. Constantinescu].

JorgensenPublished Analytic continuation of local representations of Lie groups, \textit{Pacific J.\ Math.}\ \textbf{125} (1986), 397--408. M.R. 88m:22030.


Non-Self PRADO, H;TI REFLECTION POSITIVITY FOR UNITARY REPRESENTATIONS OF LIE-GROUPS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 723;EP 731;PG 9;JI Proc. Amer. Math. Soc.;PY 1992;PD MAR;VL 114;IS 3;GA HH836;J9 PROC AMER MATH SOC;UT ISI:A1992HH83600024;

PRADO, H;TI SPECTRAL PROPERTIES FOR OPERATORS IN A LIE-ALGEBRA;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 527;EP 530;PG 4;JI Proc. Amer. Math. Soc.;PY 1989;PD JUN;VL 106;IS 2;GA AJ205;J9 PROC AMER MATH SOC;UT ISI:A1989AJ20500037;



Self Analytic continuation of local representations of symmetric spaces, \textit{J.~Funct.\ Anal.}\ \textbf{70} (1987) 304--322. 88d:22021 [A. Sitaram].


JorgensenPublished Analytic continuation of local representations of symmetric spaces, \textit{J.~Funct.\ Anal.}\ \textbf{70} (1987) 304--322. 88d:22021 [A. Sitaram].


Non-Self PRADO, H;TI REFLECTION POSITIVITY FOR UNITARY REPRESENTATIONS OF LIE-GROUPS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 723;EP 731;PG 9;JI Proc. Amer. Math. Soc.;PY 1992;PD MAR;VL 114;IS 3;GA HH836;J9 PROC AMER MATH SOC;UT ISI:A1992HH83600024;

PRADO, H;TI SPECTRAL PROPERTIES FOR OPERATORS IN A LIE-ALGEBRA;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 527;EP 530;PG 4;JI Proc. Amer. Math. Soc.;PY 1989;PD JUN;VL 106;IS 2;GA AJ205;J9 PROC AMER MATH SOC;UT ISI:A1989AJ20500037;


Non-Self Schrader, Robert(D-FUB) Reflection positivity for the complementary series of ${\rm SL}(2n,{C})$. Publ. Res. Inst. Math. Sci. 22 (1986), no. 1, 119--141.



JorgensenPublished Approximately inner derivations, decompositions and vector fields of simple $C^{*}$-algebras, \textit{Mappings of operator algebras: Proceedings of the Japan-U.S. Joint Seminar} (Philadelphia, 1988) (H. Araki and R.V. Kadison, eds.), Progr.\ Math., vol.~



Noncommutative differential geometry, quantization, and smooth symmetries of the $C^{\ast}$-algebras associated to topological dynamics, \textit{Integral Equations Operator Theory\/} \textbf{12 }(1989) 632--712. M.R. 91c:46092.

JorgensenPublished Approximately invariant subspaces for unbounded linear operators II, \textit{Math.\ Ann.}\ \textbf{227 }(1977) 177--182. M.R. 55:11097 [W. Timmermann].



Self (with O. Bratteli) Unbounded *-derivations and infinitesimal generators on operator algebras, in Proceedings of the AMS\ Summer Institute on Operator Algebras, Kingston, Ontario, 1980,



Self Essential self-adjointness of semibounded operators, \textit{Math.\ Ann.}\ \textbf{237 }(1978) 187--192. M.R. 80b:47035 [W. Timmermann].

Self Monotone convergence of operator semigroups and the dynamics of infinite particle systems, \textit{J.~Approx.\ Theory} \textbf{43 }(1985) 205--230. M.R. 86d:47052 [C. Batty].


JorgensenPublished Approximately reducing subspaces for unbounded linear operators, \textit{J.~Funct.\ Anal.}\ \textbf{23 }(1976) 392--414. M.R. 54:11107 [W. Timmermann].


Non-Self Batty, C. J. K. Dissipative mappings with approximately invariant subspaces. J. Funct. Anal. 32 (1979), no. 3, 336--341.




Self Approximately invariant subspaces for unbounded linear operators II, \textit{Math.\ Ann.}\

Self Essential self-adjointness of semibounded operators, \textit{Math.\ Ann.}\ \textbf{237 }(1978) 187--192. M.R. 80b:47035 [W. Timmermann].



JorgensenPublished Commutation properties for automorphism groups of von Neumann algebras and exponentiation of derivations, \textit{J.~Funct.\ Anal.}\ \textbf{34 } (1979) 138--145. M.R. 81g:46097 [M. Choda].



JorgensenPublished Commutative algebras of unbounded operators, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{123 }(1987) 508--527. M.R. 88e:47088 [W. Timmermann].


Non-Self ANTOINE, JP; KARWOWSKI, W;TI COMMUTING NORMAL OPERATORS IN PARTIAL OP-STAR-ALGEBRAS;SO ANNALES DE L INSTITUT HENRI POINCARE-PHYSIQUE THEORIQUE;BP 161;EP 185;PG 25;JI Ann. Inst. Henri Poincare-Phys. Theor.;PY 1989;VL 50;IS 2;GA U9086;J9 ANN INST HENRI PO

ATHAVALE, A; BARGMANN-TYPE KERNELS AND UNBOUNDED SUBNORMALS; ROCKY MT J MATH 24: (3) 891-904 SUM 1994

Sholapurkar, VM; Athavale, A; Completely and alternatingly hyperexpansive operators; J OPERAT THEOR 43: (1) 43-68 WIN 2000

Stochel, J; Positive definiteness and commutativity of operators; P AM MATH SOC 126: (2) 431-440 FEB 1998

Non-Self STOCHEL, JB; SUBNORMALITY AND GENERALIZED COMMUTATION RELATIONS OF FAMILIES OF OPERATORS; GLASGOW MATH J 32: 231-238 Part 2 MAY 1990

Non-Self STOCHEL, JB;TI SUBNORMALITY AND GENERALIZED COMMUTATION RELATIONS;SO GLASGOW MATHEMATICAL JOURNAL;BP 259;EP 262;PG 4;JI Glasg. Math. J.;PY 1988;PD SEP;VL 30;PN 3;GA Q6465;J9 GLASGOW MATH J;UT ISI:A1988Q646500002;

Non-Self STOCHEL, JB;TI SUBNORMALITY OF GENERALIZED CREATION OPERATORS ON BARGMANN; SPACE OF AN INFINITE-ORDER;SO INTEGRAL EQUATIONS AND OPERATOR THEORY;BP 1011;EP 1032;PG 22;JI Integr. Equ. Oper. Theory;PY 1992;PD NOV;VL 15;IS 6;GA KA623;J9 INTEGRAL EQUATION OP

Non-Self Szafraniec, FH; Subnormality in the quantum harmonic oscillator; COMMUN MATH PHYS 210: (2) 323-334 MAR 2000

Self (with X.-C. Quan) Positivity and cohomology for involutive semigroups, \textit{Semigroup

JorgensenPublished Commutators of Hamiltonian operators and non-abelian algebras (Extensions of symmetric operators and unbounded derivations), \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{73 }(1980) 115--133. M.R. 31a:47046 [E. Azoff].


Non-Self PEDERSEN, S;TI GROUPS OF ISOMETRIES ON OPERATOR-ALGEBRAS;SO STUDIA MATHEMATICA;BP 103;EP 116;PG 14;JI Studia Math.;PY 1988;VL 90;IS 2;GA P9969;J9 STUD MATH;UT ISI:A1988P996900002;

(with O. Bratteli) Unbounded *-derivations and infinitesimal generators on operator algebras, in Proceedings of the AMS\ Summer Institute on Operator Algebras, Kingston, Ontario, 1980,


Self Point-spectrum of semibounded operator extension, \textit{Proc.\ Amer.\ Math.\ Soc.}\ \textbf{81} (1981) 565--569. M.R. 82e:47028 [W. Allegretto].

JorgensenPublished Compact symmetry groups and generators for sub-Markovian semigroups, \textit{Z.~Wahr\-schein\-lich\-keits\-the\-o\-rie und Verw.\ Gebiete\/} \textbf{63 }(1983) 17--27. M.R. 84e:47055 [F.~Hirsch].





JorgensenPublished Distribution representations of Lie groups, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{65 }(1978) 1--19. M.R. 58:1026 [A.J. Coleman].

Manchon, D;TI Distributions with compact support and unit representations;SO JOURNAL OF LIE THEORY;BP 403;EP 424;PG 22;JI J. Lie Theory;PY 1999;VL 9;IS 2;GA 304ZH;J9 J LIE THEORY;UT ISI:000086514200010;

JorgensenPublished Ergodic properties of one-parameter automorphism groups on operator algebras,\textit{\ J.~Math.\


Non-Self Jajte, Ryszard Strong limit theorems in noncommutative probability. Lecture Notes in Mathematics, 1110. Springer-Verlag, Berlin-New York, 1985.

Non-Self McAsey, Michael; Muhly, Paul S.(1-IA); Saito, Kichi-Suke(J-NIGAT) Nonselfadjoint crossed products. III. Infinite algebras. J. Operator Theory 12 (1984), no. 1, 3--22.

Non-Self Muhly, PS; Solel, B;TI Automorphism groups and invariant subspace lattices;SO TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 311;EP 330;PG 20;JI Trans. Am. Math. Soc.;PY 1997;PD JAN;VL 349;IS 1;GA WG685;J9 TRANS AMER MATH SOC;UT ISI:A1997WG6850001

Self (with P. Muhly and K.-S. Saito) Scattering theory and crossed products of von Neumann algebras, preprint 1986, Univ.\ of Iowa, under revision.

Self Spectral theory for one-parameter groups of isometries, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{168} (1992) 131--146. M.R. 93e:47048 [A.I. Shtern].

JorgensenPublished Essential self-adjointness of semibounded operators, \textit{Math.\ Ann.}\ \textbf{237 }(1978) 187--192. M.R. 80b:47035 [W. Timmermann].


Non-Self Arai, Asao On self-adjointness of Dirac operators in boson-fermion Fock spaces. Hokkaido Math. J. 23 (1994), no. 2, 319--353.


Non-Self XU, Y;TI UNBOUNDED COMMUTING OPERATORS AND MULTIVARIATE ORTHOGONAL; POLYNOMIALS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 1223;EP 1231;PG 9;JI Proc. Amer. Math. Soc.;PY 1993;PD DEC;VL 119;IS 4;GA ML384;J9 PROC AMER MATH SOC;UT ISI:A1993ML38



JorgensenPublished Existence of smooth solutions to the classical moment problems, \textit{Trans.\ Amer.\ Math.\ Soc.}\ \textbf{332} (1992) 839--848. M.R. 92j:44005 [T. Constantinescu].


Non-Self LEMNETE, L; APPLICATION OF THE OPERATOR PHASE-SHIFT IN THE L-PROBLEM OF MOMENTS; P AM MATH SOC 123: (3) 747-754 MAR 1995

Non-Self XIA, JB;TI ON THE SPECTRA OF SCHRODINGER-OPERATORS;SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 619;EP 645;PG 27;JI Commun. Math. Phys.;PY 1994;PD JAN;VL 159;IS 3;GA MV911;J9 COMMUN MATH PHYS;UT ISI:A1994MV91100011;



JorgensenPublished Extensions and index of Hermitian representations, \textit{Publ.\ Res.\ Inst.\ Math.\ Sci.}\ \textbf{25 }(1989) 1--23. M.R. 92b:46086 [A.I. Shtern].


Non-Self Mnatsakanova M; Morchio, G; Strocchi, F; Vernov, Y; Irreducible representations of the Heisenberg algebra in Krein spaces; J MATH PHYS 39: (5) 2969-2982 MAY 1998


JorgensenPublished Extensions of positive definite integral kernels on the Heisenberg group, \textit{J.~Funct.\ Anal.}\ \textbf{92} (1990) 474--508. M.R. 91m:22013 [L. Corwin].


Non-Self BRUZUAL, R; UNITARY EXTENSIONS OF 2-PARAMETER LOCAL SEMIGROUPS OF ISOMETRIC OPERATORS AND THE KREIN EXTENSION THEOREM; INTEGR EQUAT OPER TH 17: (3) 301-321 OCT 1993

Gabardo, JP;TI Trigonometric moment problems for arbitrary finite subsets of; Zn;SO TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 4473;EP 4498;PG 26;JI Trans. Am. Math. Soc.;PY 1998;PD NOV;VL 350;IS 11;GA 130EW;J9 TRANS AMER MATH SOC;UT ISI:00007


Semigroups of measures in noncommutative harmonic analysis, \textit{Semigroup Forum\/} \textbf{43} (1991) 263--290. M.R. 93e:43002.

Self Unitary dilations of commutation relations associated to alternating bilinear forms, \textit{Math.~Z.} \textbf{213} (1993) 425--448. M.R. 94e:81145 [Lech Jak\'{o}bczyk].

JorgensenPublished Extensions of unbounded *-derivations in UHF $C^{\ast}$-algebras, \textit{J.~Funct.\ Anal.}\ \textbf{45} (1982) 341--356. M.R. 83g:46057 [S. Sakai].


Non-Self Bratteli, Ola; A remark on extensions of quasifree derivations on the CAR-algebra. Lett. Math. Phys. 6 (1982), no. 6, 499--504.

Nakazato, Hiroshi(J-KYUS) Extension of derivations in the algebra of compact operators. J. Funct. Anal. 57 (1984), no. 2, 101--110.

PEDERSEN, S;TI GROUPS OF ISOMETRIES ON OPERATOR-ALGEBRAS;SO STUDIA MATHEMATICA;BP 103;EP 116;PG 14;JI Studia Math.;PY 1988;VL 90;IS 2;GA P9969;J9 STUD MATH;UT ISI:A1988P996900002;

Price, Geoffrey L.; Extensions of quasifree derivations on the CAR algebra. Publ. Res. Inst. Math. Sci. 19 (1983), no. 1, 345--354.

(with G. Price) Index theory and second quantization of boundary value problems, \textit{J.~Funct.\ Anal.}\ \textbf{104} (1992) 243--290. M.R. 93i:46121.

Self (with G.L. Price) Extending quasi-free derivations on the CAR-algebra, \textit{J.~Operator Theory\/} \textbf{16 }(1986) 147--155. M.R. 88a:46069 [S. Sakai].




JorgensenPublished Harmonic analysis of fractal processes via $C^{\ast}$-algebras, \textit{Math.\ Nach}.\ \textbf{200} (1999), 77--117. http://arXiv.org/abs/funct-an/9612006




JorgensenPublished Harmonic analysis on bounded regions in $\mathbf{R}^{n}$, \textit{Analysis, geometry and groups: a Riemann legacy volume} (H.M. Srivastava and T.M. Rassias, eds.), Hadronic Press Collection of Original Articles, Hadronic Press, Palm Harbor, FL, 1993, pp.~




JorgensenPublished\textit{Internat.\ J.\ Math.}\ \textbf{2}(3) (1991) 257--286. M.R. 92h:43017 [Yu.\ M. Berezanskii].


Non-Self Gabardo, JP;TI Trigonometric moment problems for arbitrary finite subsets of; Zn;SO TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 4473;EP 4498;PG 26;JI Trans. Am. Math. Soc.;PY 1998;PD NOV;VL 350;IS 11;GA 130EW;J9 TRANS AMER MATH SOC;UT ISI:00007


JorgensenPublished Monotone convergence of operator semigroups and the dynamics of infinite particle systems, \textit{J.~Approx.\ Theory} \textbf{43 }(1985) 205--230. M.R. 86d:47052 [C. Batty].


Non-Self Arendt, W.; Grabosch, A.; Greiner, G.; Groh, U.; Lotz, H. P.; Moustakas, U.; Nagel, R.; Neubrander, F.; Schlotterbeck, U. One-parameter semigroups of positive operators. Lecture Notes in Mathematics, 1184. Springer-Verlag, Berlin-New York, 1986.

Non-Self Arendt, Wolfgang(D-TBNG) Kato's inequality: a characterisation of generators of positive semigroups. Proc. Roy. Irish Acad. Sect. A 84 (1984), no. 2, 155--174.

JorgensenPublished New results on unbounded derivations and ergodic groups of automorphisms, \textit{Exposition.\




JorgensenPublished Noncommutative differential geometry, quantization, and smooth symmetries of the $C^{\ast}$-algebras associated to topological dynamics, \textit{Integral Equations Operator Theory\/} \textbf{12 }(1989) 632--712. M.R. 91c:46092.


Non-Self MATSUMOTO, K; C-ASTERISK-ALGEBRAS ASSOCIATED WITH CELLULAR-AUTOMATA; MATH SCAND 75: (2) 195-216 1994

JorgensenPublished On one-parameter groups of automorphisms, and extensions of symmetric operators associated with unbounded derivations in operator algebra, \textit{T\^{o}hoku Math.\ J.} \textbf{30 }(1978) 277--305. M.R. 58:2323 [O. Bratteli].

GIELERAK, R; JAKOBCZYK, L; OLKIEWICZ, R;TI W-ASTERISK-KMS STRUCTURE

MATHEMATICAL PHYSICS;BP 6291;EP 6303;PG 13;JI J. Math. Phys.;PY 1994;PD DEC;VL 35;IS 12;GA PV602;J9 J MATH PHYS-NY;UT ISI:A1

Non-Self KRAVCHUK, NV;TI THE DIFFERENT CONCEPTS OF DYNAMIC-SYSTEMS IN STATISTICAL; PHYSICS;SO DOPOVIDI AKADEMII NAUK UKRAINSKOI RSR SERIYA A-FIZIKO-; MATEMATICHNI TA TECHNICHNI NAUKI;BP 52;EP 54;PG 3;PY 1987;IS 3;GA G8182;J9 DOPOV AKAD NAUK UKR RSR A-FIZ;UT IS

Non-Self Rieckers, Alfred(D-TBNG-P) On the classical part of the mean field dynamics for quantum lattice systems in grand canonical representations. J. Math. Phys. 25 (1984), no. 9, 2593--2601.



JorgensenPublished Partial differential operators and discrete subgroups of a Lie group, \textit{Math.\ Ann.}\ \textbf{247} (1980) 101--110. M.R. 82b:22024 [G.L. Litvinov].



Non-Self PEDERSEN, S;TI SPECTRAL THEORY OF COMMUTING SELF-ADJOINT PARTIAL-DIFFERENTIAL; OPERATORS;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 122;EP 134;PG 13;JI J. Funct. Anal.;PY 1987;PD JUL;VL 73;IS 1;GA H6910;J9 J FUNCT ANAL;UT ISI:A1987H691000005;



Self (with S. Pedersen) Harmonic analysis on tori, \textit{Acta Appl.\ Math.}\ \textbf{10 }(1987) 87--99. M.R. 89e:22010 [R.J. Miatello].





Spectral theory of finite volume domains in $\mathbb{R}^{n}$, \textit{Adv.\ Math.}\ \textbf{44} (1982) 105--120. Z.M. 452:47057 [G. Loupias]; M.R. 84k:47024 [G. Litvinov].

JorgensenPublished Perturbation and analytic continuation of group representations, \textit{Bull.\ Amer.\ Math.\ Soc.\ }\textbf{82 }(1976) 921--924. M.R. 57:16437 [S. Sankaran].



(with F. Goodman) Lie algebras of unbounded derivations, \textit{J.~Funct.\ Anal.}\ \textbf{52} (1983) 369--384. M.R. 85e:47063 [S. Sakai].


Spectral theory for infinitesimal generators of one-parameter groups of isometries: The min-max principle and compact perturbations, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{90} (1982) 343--370. M.R. 84f: 47047 [D. Olesen].

JorgensenPublished Point-spectrum of semibounded operator extension, \textit{Proc.\ Amer.\ Math.\ Soc.}\ \textbf{81} (1981) 565--569. M.R. 82e:47028 [W. Allegretto].


Non-Self Bérard, Pierre H. Spectral geometry: direct and inverse problems. With appendixes by Gérard Besson, and by Bérard and Marcel Berger. Lecture Notes in Mathematics, 1207. Springer-Verlag, Berlin-New York, 1986.

Self Spectral theory for infinitesimal generators of one-parameter groups of isometries: The min-max principle and compact perturbations, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{90} (1982) 343--370. M.R. 84f: 47047 [D. Olesen].

JorgensenPublished Positive definite functions on the Heisenberg group, \textit{Math.~Z.} \textbf{201 }(1989) 455--476. M.R. 90m:22024 [A. Hulanicki].

BRUZUAL, R; UNITARY EXTENSIONS OF 2-PARAMETER LOCAL SEMIGROUPS OF ISOMETRIC OPERATORS AND THE KREIN EXTENSION THEOREM; INTEGR EQUAT OPER TH 17: (3) 301-321 OCT 1993


JorgensenPublished Quantization and deformation of Lie algebras, \textit{Lie algebras, cohomology, and new applications to quantum mechanics} (Springfield, MO, 1992) (Niky Kamran and Peter J. Olver, eds.), Contemp.\ Math., Vol.\ 160, American Mathematical Society, Providenc




JorgensenPublished Representations of differential operators on a Lie group, \textit{J.~Funct.\ Anal.}\ \textbf{20 }(1975) 105--135. M.R. 52:4350 [M. Duflo].


Non-Self ARENDT, W; BATTY, CJK; ROBINSON, DW;TI POSITIVE SEMIGROUPS GENERATED BY ELLIPTIC-OPERATORS ON LIE-; GROUPS;SO JOURNAL OF OPERATOR THEORY;BP 369;EP 407;PG 39;PY 1990;PD SPR;VL 23;IS 2;GA FH592;J9 J OPERAT THEOR;UT ISI:A1990FH59200007;


Bonnet, Pierre(F-SETN) Transformation de Fourier des distributions de type positif sur un groupe de Lie unimodulaire. (French) [Fourier transform of positive distributions on unimodular Lie groups] J. Funct. Anal. 55 (1984), no. 2, 220--246.

Non-Self Bratteli, O; Robinson, DW;TI Subelliptic operators on Lie groups: Variable coefficients;SO ACTA APPLICANDAE MATHEMATICAE;BP 1;EP 104;PG 104;JI Acta Appl. Math.;PY 1996;PD JAN;VL 42;IS 1;GA TU174;J9 ACTA APPL MATH;UT ISI:A1996TU17400001;

Non-Self Goodman, Roe; Elliptic and subelliptic estimates for operators in an enveloping algebra. Duke Math. J. 47 (1980), no. 4, 819--833.

Kisy\'nski, Jan On semigroups generated by differential operators on Lie groups. J. Funct. Anal. 31 (1979), no. 2, 234--244.

Non-Self Randall, J;TI The heat kernel for generalized Heisenberg groups;SO JOURNAL OF GEOMETRIC ANALYSIS;BP 287;EP 316;PG 30;JI J. Geom. Anal.;PY 1996;VL 6;IS 2;GA XZ762;J9 J GEOM ANAL;UT ISI:A1996XZ76200006;

Non-Self ROBINSON, DW;TI LIPSCHITZ OPERATORS;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 179;EP 211;PG 33;JI J. Funct. Anal.;PY 1989;PD JUL;VL 85;IS 1;GA AJ146;J9 J FUNCT ANAL;UT ISI:A1989AJ14600006;

Siebert, Eberhard(D-TBNG) Densities and differentiability properties of Gauss semigroups on a

Non-Self Siebert, Eberhard; Continuous convolution semigroups integrating a submultiplicative function. Manuscripta Math. 37 (1982), no. 3, 383--391.

Non-Self Siebert, Eberhard; Supports of holomorphic convolution semigroups and densities of symmetric convolution semigroups on a locally compact group. Arch. Math. (Basel) 36 (1981), no. 5, 423--433.

Non-Self STRICHARTZ, RS;TI LP HARMONIC-ANALYSIS AND RADON TRANSFORMS ON THE HEISENBERG-; GROUP;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 350;EP 406;PG 57;JI J. Funct. Anal.;PY 1991;PD MAR;VL 96;IS 2;GA FG952;J9 J FUNCT ANAL;UT ISI:A1991FG95200006;

Non-Self Taylor, Thomas(1-AZS) A parametrix for step-two hypoelliptic diffusion equations. Trans. Amer. Math. Soc. 296 (1986), no. 1, 191--215.

TERELST, AFM; ROBINSON, DW;TI SUBELLIPTIC OPERATORS ON LIE-GROUPS - REGULARITY;SO JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY SERIES A-PURE; MATHEMATICS AND STATISTICS;BP 179;EP 229;PG 51;JI J. Aust. Math. Soc. A-Pure Math. Stat.;PY 1994;PD OCT;VL

(with Gestur \'{O}lafsson) Unitary representations of Lie groups with reflection symmetry, \textit{{J}.~Funct.\ Anal.}\ \textbf{158} (1998), 26--88. M.R. 99m:22013 [A.L. Onishchik]. \newline http://arXiv.org/abs/funct-an/9707001


Self (with W.H. Klink) Quantum mechanics and nilpotent groups, I: The curved magnetic field, \textit{Publ.\ Res.\ Inst.\ Math.\ Sci.}\ \textbf{21 }(1985), 969--999. Z.M. 601:58027 [M.~Monastyrsky].






JorgensenPublished Representations of differential operators on a Lie group, and conditions for a Lie algebra of operators to generate a representation of the group, \textit{J.~Analyse Math.}\ \textbf{43 }(1983/84), 251--288. Z.M. 568(1985) [Th.\ Farmer]; M.R. 86k:22031 [M.



Non-Self SCHMUDGEN, K;TI NONCOMMUTATIVE MOMENT PROBLEMS;SO MATHEMATISCHE ZEITSCHRIFT;BP 623;EP 650;PG 28;JI Math. Z.;PY 1991;VL 206;IS 4;GA FJ362;J9 MATH Z;UT ISI:A1991FJ36200012;



JorgensenPublished Ruelle operators: Functions which are harmonic with respect to a transfer operator (\TeX \ manuscript, 64 pages), \textit{Mem.\ Amer.\ Math.\ Soc.,} to appear. \newline http://arXiv.org/abs/math.FA/9805141

A geometric approach to the cascade approximation operator for wavelets, \textit{Integral Equations Operator Theory} \textbf{35} (1999), 125--171. \newline http://arXiv.org/abs/math.FA/9912132

JorgensenPublished Second order right-invariant partial differential equations on a Lie group, \textit{J.~Math.\ Anal.\





JorgensenPublished Selfadjoint extension operators commuting with an algebra, \textit{Math.\ Z.} \textbf{169} (1979) 41--62. M.R. 80j:47039 [K. Schm\"{u}dgen].


Non-Self BORCHERS, HJ; YNGVASON, J;TI LOCAL NETS AND SELF-ADJOINT EXTENSIONS OF QUANTUM-FIELD; OPERATORS;SO LETTERS IN MATHEMATICAL PHYSICS;BP 151;EP 155;PG 5;JI Lett. Math. Phys.;PY 1991;PD FEB;VL 21;IS 2;GA EZ300;J9 LETT MATH PHYS;UT ISI:A1991EZ30000009;


Non-Self Driessler, Wulf; Summers, Stephen J.; Wichmann, Eyvind H. On the connection between quantum fields and later von Neumann algebras of local operators. Comm. Math. Phys. 105 (1986), no. 1, 49--84.

Non-Self FRIEDRICH, J;TI INTEGRAL-REPRESENTATIONS OF POSITIVE DEFINITE MATRIX-VALUED; DISTRIBUTIONS ON CYLINDERS;SO TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 275;EP 299;PG 25;JI Trans. Am. Math. Soc.;PY 1989;PD MAY;VL 313;IS 1;GA AC700;J9 TRANS AMER M

NACHRICHTEN;BP 273;EP 293;PG 21;JI Math. Nachr.;PY 1991;VL 151;GA GB838;J9 MATH NACHR;UT ISI:A1991GB83800016;

Non-Self INOUE, A; KUROSE, H; OTA, S;TI EXTENSIONS OF UNBOUNDED REPRESENTATIONS;SO MATHEMATISCHE NACHRICHTEN;BP 257;EP 268;PG 12;JI Math. Nachr.;PY 1992;VL 155;GA HQ955;J9 MATH NACHR;UT ISI:A1992HQ95500017;


Non-Self KISSIN, E;TI DISSIPATIVE IMPLEMENTATIONS OF STAR-DERIVATIONS OF C-STAR-; ALGEBRAS AND REPRESENTATIONS IN INDEFINITE METRIC-SPACES;SO JOURNAL OF THE LONDON MATHEMATICAL SOCIETY-SECOND SERIES;BP 451;EP 464;PG 14;JI J. Lond. Math. Soc.-Second Ser.;PY 1991;

KISSIN, E;TI INDEXES OF UNBOUNDED DERIVATIONS OF C-STAR-ALGEBRAS;SO PACIFIC JOURNAL OF MATHEMATICS;BP 125;EP 150;PG 26;JI Pac. J. Math.;PY 1992;PD JAN;VL 152;IS 1;GA GX881;J9 PAC J MATH;UT ISI:A1992GX88100009;

Non-Self KISSIN, E;TI REPRESENTATIONAL INDEXES OF DERIVATIONS OF C-ASTERISK-ALGEBRAS; AND REPRESENTATIONS OF ASTERISK-ALGEBRAS ON KREIN SPACES;SO JOURNAL FUR DIE REINE UND ANGEWANDTE MATHEMATIK;BP 71;EP 92;PG 22;JI J. Reine Angew. Math.;PY 1993;VL 439;GA LK232;J

Non-Self OTA, S;TI COMMUTATIVITY OF UNBOUNDED REPRESENTATIONS;SO PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY;BP 1051;EP 1056;PG 6;JI Proc. Amer. Math. Soc.;PY 1993;PD APR;VL 117;IS 4;GA KT226;J9 PROC AMER MATH SOC;UT ISI:A1993KT22600024;

Non-Self Schmüdgen, Konrad(DDR-KMU) On commuting unbounded selfadjoint operators. IV. Math. Nachr. 125 (1986), 83--102.

Non-Self Stochel, J; Szafraniec, FH;TI The complex moment problem and subnormality: A polar; decomposition approach;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 432;EP 491;PG 60;JI J. Funct. Anal.;PY 1998;PD NOV 10;VL 159;IS 2;GA 142QU;J9 J FUNCT ANAL;UT ISI:000077212

Non-Self TRAPANI, C;TI COMMUTATION PROPERTIES OF SYMMETRICAL OPERATORS;SO MATHEMATISCHE NACHRICHTEN;BP 305;EP 315;PG 11;JI Math. Nachr.;PY 1995;VL 174;GA RT586;J9 MATH NACHR;UT ISI:A1995RT58600021;








Self Spectral representations of unbounded nonlinear operators on Hilbert-space, \textit{Pacific J.\ Math.}\ \textbf{111 }(1984) 93--104. Z.M. 489:47038 [S.J. Bernau]; M.R. 85i:47073 [I. Cioranescu].

JorgensenPublished Selfadjoint operator extensions satisfying the Weyl commutation relations, \textit{Bull.\ Amer.\ Math.\ Soc.\ (N.S.)} \textbf{1} (1979) 266--269. M.R. 80g:47030 [E.R. Cekanovskii].


Non-Self Kurose, H; Nakazato, H;TI Geometric construction of *-representations of the Weyl algebra; with degree 2;SO PUBLICATIONS OF THE RESEARCH INSTITUTE FOR MATHEMATICAL; SCIENCES;BP 555;EP 579;PG 25;JI Publ. Res. Inst. Math. Sci.;PY 1996;PD DEC;VL 32;IS

Non-Self Schmüdgen, Konrad; On the Heisenberg commutation relation. II. Publ. Res. Inst. Math. Sci. 19 (1983), no. 2, 601--671.

Non-Self Schmüdgen, Konrad; On the Heisenberg commutation relation. I. J. Funct. Anal. 50 (1983), no. 1, 8--49.

Self A uniqueness theorem for the Heisenberg-Weyl commutation relations with non-self-adjoint position operator, \textit{Amer.\ J.\ Math.}\ \textbf{103 } (1981) 273--287. M.R. 82g:81033 [E.R. Cekanovskii].

JorgensenPublished Spectral representations of unbounded nonlinear operators on Hilbert-space, \textit{Pacific J.\ Math.}\ \textbf{111 }(1984) 93--104. Z.M. 489:47038 [S.J. Bernau]; M.R. 85i:47073 [I. Cioranescu].


Non-Self STOCHEL, JB;TI SUBNORMALITY OF GENERALIZED CREATION OPERATORS ON BARGMANN; SPACE OF AN INFINITE-ORDER;SO INTEGRAL EQUATIONS AND OPERATOR THEORY;BP 1011;EP 1032;PG 22;JI Integr. Equ. Oper. Theory;PY 1992;PD NOV;VL 15;IS 6;GA KA623;J9 INTEGRAL EQUATION OP

JorgensenPublished Spectral theory for domains in $\mathbf{R}^{n}$ of finite measure, \textit{Proc.\ Nat.\ Acad.\ Sci.\ US\/} \textbf{77} (1980) 5050--5051. M.R. 82c:22014 [E. Thoma].



Self A generalization to locally compact abelian groups of a spectral problem for commuting partial differential operators, \textit{J.~Pure Appl.\ Algebra} \textbf{25 }(1982) 297--302. M.R. 84h:43019 [G.L. Litvinov].


JorgensenPublishedprinciple and compact perturbations, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{90} (1982) 343--370. M.R. 84f: 47047 [D. Olesen].


Non-Self MAKAGON, A; MANDREKAR, V;TI THE SPECTRAL REPRESENTATION OF STABLE PROCESSES -; HARMONIZABILITY AND REGULARITY;SO PROBABILITY THEORY AND RELATED FIELDS;BP 1;EP 11;PG 11;JI Probab. Theory Relat. Field;PY 1990;VL 85;IS 1;GA CX530;J9 PROBAB THEORY RELAT F

JorgensenPublished Spectral theory for one-parameter groups of isometries, \textit{J.~Math.\ Anal.\ Appl.}\ \textbf{168} (1992) 131--146. M.R. 93e:47048 [A.I. Shtern].


Non-Self Huang, SZ; On Bernstein type theorems concerning the growth of derivatives of entire functions; P AM MATH SOC 125: (2) 493-505 FEB 1997

JorgensenPublished Spectral theory for self-adjoint operator extensions associated with Clifford algebras, \textit{Index Theory and Operator Algebras} (Boulder, CO, 1991) (Jeffrey Fox and Peter Haskell, eds.),


Non-Self ARAI, A;TI PROPERTIES OF THE DIRAC-WEYL OPERATOR WITH A STRONGLY SINGULAR; GAUGE POTENTIAL;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 915;EP 935;PG 21;JI J. Math. Phys.;PY 1993;PD MAR;VL 34;IS 3;GA KT371;J9 J MATH PHYS-NY;UT ISI:A1993KT37100003;

Non-Self ARAI, A;TI COMMUTATION PROPERTIES OF ANTICOMMUTING SELF-ADJOINT OPERATORS,; SPIN REPRESENTATION AND DIRAC OPERATORS;SO INTEGRAL EQUATIONS AND OPERATOR THEORY;BP 38;EP 63;PG 26;JI Integr. Equ. Oper. Theory;PY 1993;PD JAN;VL 16;IS 1;GA KL421;J9 INTEGRAL E

JorgensenPublished Spectral theory of finite volume domains in $\mathbb{R}^{n}$, \textit{Adv.\ Math.}\ \textbf{44} (1982) 105--120. Z.M. 452:47057 [G. Loupias]; M.R. 84k:47024 [G. Litvinov].




Non-Self Gabardo, Jean-Pierre; Nashed, M. Zuhair; An analogue of Cohen's condition for nonuniform multiresolution analyses. Wavelets, multiwavelets, and their applications (San Diego, CA, 1997),






Non-Self PEDERSEN, S;TI SPECTRAL THEORY OF COMMUTING SELF-ADJOINT PARTIAL-DIFFERENTIAL; OPERATORS;SO JOURNAL OF FUNCTIONAL ANALYSIS;BP 122;EP 134;PG 13;JI J. Funct. Anal.;PY 1987;PD JUL;VL 73;IS 1;GA H6910;J9 J FUNCT ANAL;UT ISI:A1987H691000005;




Self (with S. Pedersen) Harmonic analysis on tori, \textit{Acta Appl.\ Math.}\ \textbf{10 }(1987) 87--99. M.R. 89e:22010 [R.J. Miatello].





Self A generalization to locally compact abelian groups of a spectral problem for commuting partial differential operators, \textit{J.~Pure Appl.\ Algebra} \textbf{25 }(1982) 297--302. M.R. 84h:43019 [G.L. Litvinov].






JorgensenPublished The existence problem for dynamics of dissipative systems in quantum probability [orig. title: The existence problem for dynamics in the C*-algebraic formulation of dissipative quantum systems], Aarhus Preprint No. 1, 1980--1



Self Monotone convergence of operator semigroups and the dynamics of infinite particle systems, \textit{J.~Approx.\ Theory} \textbf{43 }(1985) 205--230. M.R. 86d:47052 [C. Batty].

JorgensenPublished The integrability problem for infinite-dimensional representations of finite-dimensional Lie algebras, \textit{Exposition.\ Math.}\ \textbf{1} (1983), no.~4, 289--306. M.R. 87d:17007; Z.M. 527:22013.


Non-Self SCHMUDGEN, K;TI INTEGRABLE OPERATOR REPRESENTATIONS OF RQ(2), XQ,GAMMA AND; SLQ(2,R);SO COMMUNICATIONS IN MATHEMATICAL PHYSICS;BP 217;EP 237;PG 21;JI Commun. Math. Phys.;PY 1994;PD JAN;VL 159;IS 2;GA MT881;J9 COMMUN MATH PHYS;UT ISI:A1994MT88100001;

PHYSICS;BP 3211;EP 3229;PG 19;JI J. Math. Phys.;PY 1994;PD JUN;VL 35;IS 6;GA NP302;J9 J MATH PHYS-NY;UT ISI:A1994NP30200039;

Volkel, AH;TI Symmetry and symmetry breaking in quantum-chrome (flavor)-; dynamics;SO JOURNAL OF MATHEMATICAL PHYSICS;BP 1928;EP 1956;PG 29;JI J. Math. Phys.;PY 1998;PD APR;VL 39;IS 4;GA ZF218;J9 J MATH PHYS-NY;UT ISI:000072875500012;




JorgensenPublished Trace states and KMS states for approximately inner dynamical one-parameter groups of *-automorphisms, \textit{Comm.\ Math.\ Phys.}% \ \textbf{53 } (1977) 35--142. M.R. 55:7190 [C.M. Edwards].



JorgensenPublished Unbounded operators: Perturbations and commutativity problems, \textit{J.~Funct.\ Anal.}\ \textbf{39} (1980) 281--307. M.R. 82e:47003 [C.R. Putnam].



Non-Self INOUE, A;TI AN UNBOUNDED GENERALIZATION OF THE TOMITA-TAKESAKI THEORY .2.;SO PUBLICATIONS OF THE RESEARCH INSTITUTE FOR MATHEMATICAL; SCIENCES;BP 673;EP 726;PG 54;JI Publ. Res. Inst. Math. Sci.;PY 1987;PD OCT;VL 23;IS 4;GA L4825;J9 PUBL RES INST MATH SC


Non-Self Izumino, Saichi(J-TOYAU) Decomposition of quotients of bounded operators with respect to closability and Lebesgue-type decomposition of positive operators. Hokkaido Math. J. 18 (1989), no. 2, 199--209.

Non-Self Kosaki, H;TI Characteristic matrix of the tensor product of operators;SO JOURNAL OF OPERATOR THEORY;BP 357;EP 372;PG 16;JI J. Operat. Theor.;PY 1998;PD FAL;VL 40;IS 2;GA 162GN;J9 J OPERAT THEOR;UT ISI:000078337700007;

Non-Self Kosaki, Hideki Lebesgue decomposition of states on a von Neumann algebra. Amer. J. Math. 107 (1985), no. 3, 697--735.

Non-Self Kosaki, Hideki Remarks on Lebesgue-type decomposition of positive operators. J. Operator Theory 11 (1984), no. 1, 137--143.

(with Gestur \'{O}lafsson) Unitary representations of Lie groups with reflection symmetry, \textit{{J}.~Funct.\ Anal.}\ \textbf{158} (1998), 26--88. M.R. 99m:22013 [A.L. Onishchik]. \newline http://arXiv.org/abs/funct-an/9707001


JorgensenPublished Unitary dilations and the $C^{\ast}$ algebra $\mathcal{O}_{2}$, \textit{Israel J.\ Math.}\ \textbf{56 }(1986) 129--142. M.R. 88c:47012 [W. Paschke].



JorgensenPublished Unitary dilations of symplectic vector spaces, \textit{C.R.\ Math.\ Rep.\ Acad.\ Sci.\ Canada\/} \textbf{12} (1990) 91--94. M.R. 91k:17022 [C.J. Atkin].



All citations by type - Department of Mathematics ...jorgen/allcit.pdf · Self Existence of smooth solutions to the classical moment problems, ... M.R. 92j:44005 [T. Constantinescu].

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