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Brane-Antibrane and Closed Superstrings at Finite Temperature in the Framework of Thermo Field Dynamics arXiv:1407.xxxx +α Hokkaido Univ. Kenji Hotta
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Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

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Page 1: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

Brane-Antibrane and Closed Superstrings at Finite Temperature in the Framework of Thermo Field Dynamics

arXiv:1407.xxxx +α

Hokkaido Univ. Kenji Hotta

Page 2: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

1. Introduction

n  Hagedorn Temperature (type II)

maximum temperature for perturbative strings A single energetic string captures most of the energy.

Page 3: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Dp-Dp pairs (type II) unstable at zero temperature open string tachyon tachyon potential Sen’s conjecture  potential height=brane tension

n  Brane-antibrane Pair Creation Transition Hotta finite temperature system of Dp-Dp pairs based on Matsubara formalism and on BSFT 1-loop (cylinder world sheet) Conformal invariance is broken by the boundary terms. ambiguity in choosing the Weyl factors cylinder boundary action Andreev-Oft

finite temperature effective potential

D9-D9 pairs become stable near the Hagedorn temperature.

Page 4: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Thermo Field Dynamics (TFD) Takahashi-Umezawa statistical average

We can represent it as

by introducing a fictitious copy of the system.

thermal vacuum state

We cannot represent it as

for ordinary number , since

cannot be satisfied.

Page 5: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

Hawking-Unruh effect can be described by TFD. It is expected that TFD is available to non-equilibrium

system. (real time formalism)

TFD has been applied to string theory

string field theory Leblanc D-brane Vancea, Cantcheff, etc. closed bosonic string Abdalla-Gadelha-Nedel AdS background Grada-Vancea, etc. pp-wave background Nedel-Abdalla-Gadelha, etc.

At the lowest order we do not use one-loop amplitude. There is no problem of the choice of Weyl factors.

finite temperature system of Dp-Dp and closed superstring based on TFD?

Page 6: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

Contents

1. Introduction ü 2. Brane-antibrane Pair in TFD 3. Closed Superstring in TFD 4. Conclusion and Discussion

Page 7: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

2. Brane-antibrane Pair in TFD

n  Light-Cone Momentum

We consider a single first quantized string. light-cone momentum

partition function for a single string

Page 8: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  BSFT (Boundary String Field Theory) (BV formalism)

solution of classical master eq. (superstring) : effective action : 2-dim. partition function

n  Disk (tree level tachyon potential)

: complex scalar field : tension of Dp-brane : coupling of strings : p-dim. volume

Page 9: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Mass Spectrum We consider an open string on a Brane-antibrane pair.

mass spectrum space time boson space time fermion

number ops. oscillation mode of world sheet boson oscillation mode of world sheet fermion (NS b. c) oscillation mode of world sheet fermion (R b. c)

We will show only the NS mode case.

Page 10: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Bogoliubov Transformation generator of Bogoliubov tr.

n  Thermal Vacuum State

thermal vacuum state for a single string

Page 11: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Free Energy for a Single String

Hamiltonian

entropy

This is not useful for analysis of thermodynamical system of strings. free energy for a single string partition function for a single string free energy for multiple strings (string gas)

Page 12: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Partition Function for a Single String

n  Free Energy for Multiple Strings

Free energy for multiple strings can be obtained from the following eq.

This equals to the free energy based on Matsubara formalism. This implies that our choice of Weyl factors in the case of Matsubara formalism is quite natural.

Page 13: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

3. Closed Superstring in TFD

n  Mass Spectrum

space time boson space time fermion

We show only the NS-NS mode case. GSO projection

level-matching condition

Page 14: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Thermal Vacuum State generator of Bogoliubov tr.

thermal vacuum state for a single string

Page 15: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Free Energy for a Single String

Hamiltonian entropy

level-matching condition

GSO projection

Page 16: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

Relation between and .

Page 17: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Partition Function for a Single String

domain of integration S

Page 18: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  Free Energy for Multiple Strings

Free energy for multiple strings can be obtained from the following eq.

This equals to the free energy in the S-representation based on Matsubara formalism. We can transform this to the F-representation or the Dual-representation by using modular transformation.

Page 19: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

4. Conclusion and Discussion n  Brane-antibrane in TFD

We computed thermal vacuum state and partition function of a single string on a Brane-antibrane pair based on TFD. The free energy for multiple strings agrees with that based on the Matsubara formalism. There are no problem of the choice of the Weyl factors.

n  Closed Superstring Gas in TFD We computed thermal vacuum state and partition function of a single closed superstring based on

TFD. The free energy for multiple strings agrees with that based on the Matsubara formalism.

Page 20: Hokkaido Univ. Kenji Hottaqft.web/2014/slides/hotta.pdf · Hokkaido Univ. Kenji Hotta . 1. Introduction ! Hagedorn Temperature (type II) maximum temperature for perturbative strings

n  String Field Theory We need to use second quantized string field theory in order to obtain the thermal vacuum state for multiple strings.

n  D-brane boundary state of closed string cf) Cantcheff The thermal vacuum state is reminiscent of the D-brane boundary state of a closed string.

n  Hawking-Unruh Effect closed strings in curved spacetime black hole firewall Almheiri-Marolf-Polchinski-Sully Planck solid model Hotta