Page 1
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Intrinsic linking and knotting in straight-edgeembeddings of complete graphs
Lew Ludwig
Denison UniversityGranville, Ohio
International Workshop on Spatial Graphs 2010Waseda University, Tokyo, JAPAN
August, 2010
Lew Ludwig Straight-edge links and knots
Page 2
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Outline
1 Background
2 Project One: K6 Links
3 Project Two: K7 Links
4 Project Three: K7 Knots
5 Project Four: K9
6 Further Work
Lew Ludwig Straight-edge links and knots
Page 3
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project One - Started it all. . .
1983-4: Conway and Gordon, and Sachs:K6 is intrinsically linked
K6 K6
Interesting side note...
Lew Ludwig Straight-edge links and knots
Page 4
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project One - Started it all. . .
1983-4: Conway and Gordon, and Sachs:K6 is intrinsically linked
K6 K6
Interesting side note...
Lew Ludwig Straight-edge links and knots
Page 5
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Characterization (“Kura-cterization”)
1993: Robertson, Seymour, and Thomas:
A graph is intrinsically linked iff it contains one ofthe Petersen graphs as a minor
K6 K4,4-edgeK3,3,1
G7 G8 G9
P
Lew Ludwig Straight-edge links and knots
Page 6
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examining linking and knotting in more complex orspecialized structures:
1 Every embedding contains two disjoint links
2 Links with three or more components(complexity - mnl(G ))
3 Certain types of graphs (-partite)
4 Straight-edge embeddings of graphs
Lew Ludwig Straight-edge links and knots
Page 7
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examining linking and knotting in more complex orspecialized structures:
1 Every embedding contains two disjoint links
2 Links with three or more components(complexity - mnl(G ))
3 Certain types of graphs (-partite)
4 Straight-edge embeddings of graphs
Lew Ludwig Straight-edge links and knots
Page 8
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examining linking and knotting in more complex orspecialized structures:
1 Every embedding contains two disjoint links
2 Links with three or more components(complexity - mnl(G ))
3 Certain types of graphs (-partite)
4 Straight-edge embeddings of graphs
Lew Ludwig Straight-edge links and knots
Page 9
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examining linking and knotting in more complex orspecialized structures:
1 Every embedding contains two disjoint links
2 Links with three or more components(complexity - mnl(G ))
3 Certain types of graphs (-partite)
4 Straight-edge embeddings of graphs
Lew Ludwig Straight-edge links and knots
Page 10
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examining linking and knotting in more complex orspecialized structures:
1 Every embedding contains two disjoint links
2 Links with three or more components(complexity - mnl(G ))
3 Certain types of graphs (-partite)
4 Straight-edge embeddings of graphs
Lew Ludwig Straight-edge links and knots
Page 11
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Why straight–edge embeddings?
07/24/2007 01:58 PMfig11.gif 374!362 pixels
Page 1 of 1http://plus.maths.org/issue15/features/knots/fig11.gif
Polyethylene - linear/cyclic, 63 to 78 backbone atoms
Lew Ludwig Straight-edge links and knots
Page 12
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Why straight–edge embeddings?07/24/2007 01:58 PMfig11.gif 374!362 pixels
Page 1 of 1http://plus.maths.org/issue15/features/knots/fig11.gif
Polyethylene - linear/cyclic, 63 to 78 backbone atoms
Lew Ludwig Straight-edge links and knots
Page 13
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Why straight–edge embeddings?07/24/2007 01:58 PMfig11.gif 374!362 pixels
Page 1 of 1http://plus.maths.org/issue15/features/knots/fig11.gif
Polyethylene - linear/cyclic, 63 to 78 backbone atoms
Lew Ludwig Straight-edge links and knots
Page 14
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 1: The motivating question
2004: Workshop with Colin Adams
(D. Hunt, ONU)How many linked components occur in astraight–edge embedding of K6?
Recall, this number must be odd...
Lew Ludwig Straight-edge links and knots
Page 15
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 1: The motivating question
2004: Workshop with Colin Adams
(D. Hunt, ONU)How many linked components occur in astraight–edge embedding of K6?
Recall, this number must be odd...
Lew Ludwig Straight-edge links and knots
Page 16
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 1 results
(2006, Hughes)(2007, Huh and Jeon)
Every straight-edgeembedding of K6
has 1 or 3two-componentlinks
K 26 : [4,4,4,4,4,4]
Lew Ludwig Straight-edge links and knots
Page 17
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 1 results
(2006, Hughes)(2007, Huh and Jeon)
Every straight-edgeembedding of K6
has 1 or 3two-componentlinks
K 26 : [4,4,4,4,4,4]
Lew Ludwig Straight-edge links and knots
Page 18
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 1 results
(2006, Hughes)(2007, Huh and Jeon)
Every straight-edgeembedding of K6
has 1 or 3two-componentlinks
K 26 : [4,4,4,4,4,4]
Lew Ludwig Straight-edge links and knots
Page 19
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 1 results
(2006, Hughes)(2007, Huh and Jeon)
Every straight-edgeembedding of K6
has 1 or 3two-componentlinks
K 26 : [4,4,4,4,4,4]
Lew Ludwig Straight-edge links and knots
Page 20
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 1 results
(2006, Hughes)(2007, Huh and Jeon)
Every straight-edgeembedding of K6
has 1 or 3two-componentlinks
K 26 : [4,4,4,4,4,4]
Lew Ludwig Straight-edge links and knots
Page 21
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 1 results
(2004: Hughes and Ludwig (2006))(2007: Huh and Jeon)
Every straight-edgeembedding of K6
has 1 or 3two-componentlinks
K 16 : [3,3,4,4,5,5]
5 5
33
44
Lew Ludwig Straight-edge links and knots
Page 22
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Now what?
Lew Ludwig Straight-edge links and knots
Page 23
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 2: 2006: Arbisi and Ludwig (2010)
K7Lew Ludwig Straight-edge links and knots
Page 24
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The good . . .
K17
6
3
6
34
4
4
(3-3)
(3-4)
(3-3) links: 7
(3-4) links: 14
Lew Ludwig Straight-edge links and knots
Page 25
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The bad . . .
K27 (K3
7 )6
5
3
35
3
5
(3-3) links: 7 or 9
(3-4) links: 14 or 18
Lew Ludwig Straight-edge links and knots
Page 26
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The ugly . . .
the INTERESTING!
K47
5
5
5
3
4
4
4
K57
5
5
4
4
4 4
4
Lew Ludwig Straight-edge links and knots
Page 27
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The ugly . . . the INTERESTING!
K47
5
5
5
3
4
4
4
K57
5
5
4
4
4 4
4
Lew Ludwig Straight-edge links and knots
Page 28
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The ugly . . . the INTERESTING!
K47
5
5
5
3
4
4
4
K57
5
5
4
4
4 4
4
Lew Ludwig Straight-edge links and knots
Page 29
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Counting links in K 57
5
5
4
4
4 4
4
5
5
4
4
4 4
4
Lew Ludwig Straight-edge links and knots
Page 30
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Counting links in K 57
5
5
4
4
4 4
4
5
5
4
4
4 4
4
Lew Ludwig Straight-edge links and knots
Page 31
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Counting links in K 57
v₁
v₃
v₅
v₄
v₂
v₁
v₃
v₅
v₄
v₂17
13
15
15
15
15
15
13
13
13
13
v₁
v₃
v₅
v₄
v₂x
26
30
30
30
30
30
26
26
26
26
v₁
v₃
v₅
v₄
v₂31
23
27
27
27
27
27
23
23
23
23(3-3) links: 13, 15, 17
(3-4) links: 26, 30, (x)(3-4) links: 26, 30, (x)
(3-4) links: 23, 27, 31
Lew Ludwig Straight-edge links and knots
Page 32
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Counting links in K 57
v₁
v₃
v₅
v₄
v₂
v₁
v₃
v₅
v₄
v₂17
13
15
15
15
15
15
13
13
13
13
v₁
v₃
v₅
v₄
v₂x
26
30
30
30
30
30
26
26
26
26
v₁
v₃
v₅
v₄
v₂31
23
27
27
27
27
27
23
23
23
23
(3-3) links: 13, 15, 17
(3-4) links: 26, 30, (x)(3-4) links: 26, 30, (x)
(3-4) links: 23, 27, 31
Lew Ludwig Straight-edge links and knots
Page 33
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Counting links in K 57
v₁
v₃
v₅
v₄
v₂
v₁
v₃
v₅
v₄
v₂17
13
15
15
15
15
15
13
13
13
13
v₁
v₃
v₅
v₄
v₂x
26
30
30
30
30
30
26
26
26
26
v₁
v₃
v₅
v₄
v₂31
23
27
27
27
27
27
23
23
23
23
(3-3) links: 13, 15, 17
(3-4) links: 26, 30, (x)
(3-4) links: 26, 30, (x)
(3-4) links: 23, 27, 31
Lew Ludwig Straight-edge links and knots
Page 34
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Counting links in K 57
v₁
v₃
v₅
v₄
v₂
v₁
v₃
v₅
v₄
v₂17
13
15
15
15
15
15
13
13
13
13
v₁
v₃
v₅
v₄
v₂x
26
30
30
30
30
30
26
26
26
26
v₁
v₃
v₅
v₄
v₂31
23
27
27
27
27
27
23
23
23
23(3-3) links: 13, 15, 17
(3-4) links: 26, 30, (x)
(3-4) links: 26, 30, (x)
(3-4) links: 23, 27, 31
Lew Ludwig Straight-edge links and knots
Page 35
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examine larger structures...?
K8 has 14 distinct convex hull embeddings, eachwith a possible
•(
83
)(53
)=560 (3-3) links (140)
•(
84
)(43
)=280 (3-4) links (70)
•(
84
)=70 (4-4) links
•(
85
)=56 (5-3) links
K9 has 219 distinct convex hulls!
Lew Ludwig Straight-edge links and knots
Page 36
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examine larger structures...?
K8 has 14 distinct convex hull embeddings, eachwith a possible
•(
83
)(53
)=560 (3-3) links (140)
•(
84
)(43
)=280 (3-4) links (70)
•(
84
)=70 (4-4) links
•(
85
)=56 (5-3) links
K9 has 219 distinct convex hulls!
Lew Ludwig Straight-edge links and knots
Page 37
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examine larger structures...?
K8 has 14 distinct convex hull embeddings, eachwith a possible
•(
83
)(53
)=560 (3-3) links (140)
•(
84
)(43
)=280 (3-4) links (70)
•(
84
)=70 (4-4) links
•(
85
)=56 (5-3) links
K9 has 219 distinct convex hulls!
Lew Ludwig Straight-edge links and knots
Page 38
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What next?
Examine larger structures...?
K8 has 14 distinct convex hull embeddings, eachwith a possible
•(
83
)(53
)=560 (3-3) links (140)
•(
84
)(43
)=280 (3-4) links (70)
•(
84
)=70 (4-4) links
•(
85
)=56 (5-3) links
K9 has 219 distinct convex hulls!
Lew Ludwig Straight-edge links and knots
Page 39
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What about knots?
In 1983, Conway and Gordon also showed that K7 is intrinsicallyknotted.
For K7, how many possible knots are there?
• There are 6!/2=360 Hamiltonian cycles of length 7.
• There are 7 · 5!/2=420 Hamiltonian cycles of length 6.
Lew Ludwig Straight-edge links and knots
Page 40
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
What about knots?
In 1983, Conway and Gordon also showed that K7 is intrinsicallyknotted.
For K7, how many possible knots are there?
• There are 6!/2=360 Hamiltonian cycles of length 7.
• There are 7 · 5!/2=420 Hamiltonian cycles of length 6.
Lew Ludwig Straight-edge links and knots
Page 41
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project 3 - 2007: Grotheer and Ludwig (2009, Foisy and Ludwig)
Inte
rnal
Edg
es
Cyc
les
Kno
ts
Cyc
les
Kno
ts
Cyc
les
Kno
ts
Cyc
les
Kno
ts
Cyc
les
Kno
ts
0 14 0 18 0 17 0 24 0 30 0
1 80 0 72 0 92 0 96 0 90 0
2 164 0 174 0 143 0 123 0 120 0
3 88 1 78 1, 3 91 0, 1 90 2, 3 90 1, 2, 3, 4, 5
4 14 0 18 0, 2 16 0, 1, 2 24 0, 1 20 2, 4
5 0 0 0 0 1 0, 1 3 0 10 1, 5
6 0 0 0 0 0 0 0 0 0 0
K 17 K 2
7 K 37 K 4
7 K 57
Lew Ludwig Straight-edge links and knots
Page 42
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further WorkIn
tern
alE
dges
Cyc
les
Kno
ts
Cyc
les
Kno
ts
Cyc
les
Kno
ts
Cyc
les
Kno
ts
Cyc
les
Kno
ts
0 14 0 18 0 17 0 24 0 30 0
1 80 0 72 0 92 0 96 0 90 0
2 164 0 174 0 143 0 123 0 120 0
3 88 1 78 1, 3 91 0, 1 90 2, 3 90 1, 2, 3, 4, 5
4 14 0 18 0, 2 16 0, 1, 2 24 0, 1 20 2, 4
5 0 0 0 0 1 0, 1 3 0 10 1, 5
6 0 0 0 0 0 0 0 0 0 0
K 17 K 2
7 K 37 K 4
7 K 57
Lew Ludwig Straight-edge links and knots
Page 43
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project Four - 2008: Behrend and Ludwig
Recall we only looked at embeddings where all vertices were on theexternal hull: two for K6, five for K7, fourteen for K8, and so on...
Question:Given Kn with m external vertices and k = n −m internal vertices,is that embedding always ambient isotopic to an embedding with nexternal vertices?
Lew Ludwig Straight-edge links and knots
Page 44
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Project Four - 2008: Behrend and Ludwig
Recall we only looked at embeddings where all vertices were on theexternal hull: two for K6, five for K7, fourteen for K8, and so on...
Question:Given Kn with m external vertices and k = n −m internal vertices,is that embedding always ambient isotopic to an embedding with nexternal vertices?
Lew Ludwig Straight-edge links and knots
Page 45
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The idea v6
v8
v7
v3
v4
v1 v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
Lew Ludwig Straight-edge links and knots
Page 46
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The idea v6
v8
v7
v3
v4
v1 v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
Lew Ludwig Straight-edge links and knots
Page 47
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The idea v6
v8
v7
v3
v4
v1 v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
Lew Ludwig Straight-edge links and knots
Page 48
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
The idea v6
v8
v7
v3
v4
v1 v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
v6
v8
v7
v3
v4
v1v2
v5
v9
Lew Ludwig Straight-edge links and knots
Page 49
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Further work
• Given Kn with m external vertices and k = n −m internalvertices, is that embedding always ambient isotopic to anembedding with n external vertices?
• Given Kn how many (k , m) links does it contain?3 ≤ k ≤ n − 3, 3 ≤ m ≤ n − k?
• Upper/lower bounds?
• Is every straight-edge embedding of K9 triple-linked?
Lew Ludwig Straight-edge links and knots
Page 50
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Further work
• Given Kn with m external vertices and k = n −m internalvertices, is that embedding always ambient isotopic to anembedding with n external vertices?
• Given Kn how many (k , m) links does it contain?3 ≤ k ≤ n − 3, 3 ≤ m ≤ n − k?
• Upper/lower bounds?
• Is every straight-edge embedding of K9 triple-linked?
Lew Ludwig Straight-edge links and knots
Page 51
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Further work
• Given Kn with m external vertices and k = n −m internalvertices, is that embedding always ambient isotopic to anembedding with n external vertices?
• Given Kn how many (k , m) links does it contain?3 ≤ k ≤ n − 3, 3 ≤ m ≤ n − k?
• Upper/lower bounds?
• Is every straight-edge embedding of K9 triple-linked?
Lew Ludwig Straight-edge links and knots
Page 52
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Further work
• Given Kn with m external vertices and k = n −m internalvertices, is that embedding always ambient isotopic to anembedding with n external vertices?
• Given Kn how many (k , m) links does it contain?3 ≤ k ≤ n − 3, 3 ≤ m ≤ n − k?
• Upper/lower bounds?
• Is every straight-edge embedding of K9 triple-linked?
Lew Ludwig Straight-edge links and knots
Page 53
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Is every straight-edge embedding of K9 triple-linked?
(2001: Flapan, Naimi, and Pommershein)
K10 is intrinsically triple-linked.
Lew Ludwig Straight-edge links and knots
Page 54
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Is every straight-edge embedding of K9 triple-linked?
(2001: Flapan, Naimi, and Pommershein)
K10 is intrinsically triple-linked.
Lew Ludwig Straight-edge links and knots
Page 55
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
K9 is NOT intrinsically triple-linked.
2
4
6
8
1
3
5 7
9
Is every straight-edge embedding of K9 triple-linked?
Lew Ludwig Straight-edge links and knots
Page 56
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
K9 is NOT intrinsically triple-linked.
2
4
6
8
1
3
5 7
9
Is every straight-edge embedding of K9 triple-linked?
Lew Ludwig Straight-edge links and knots
Page 57
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
K9 is NOT intrinsically triple-linked.
2
4
6
8
1
3
5 7
9
Is every straight-edge embedding of K9 triple-linked?
Lew Ludwig Straight-edge links and knots
Page 58
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Thanks. . .
• Colleen Hughes (’06)
• Pam Arbisi (’07)
• Rachel Grotheer (’08)
• Sam Berhend (’09)
• Clay Crocker and Matt Gibson (’13)
• Anderson Research Endowment
Lew Ludwig Straight-edge links and knots
Page 59
BackgroundProject One: K6 LinksProject Two: K7 Links
Project Three: K7 KnotsProject Four: K9
Further Work
Thanks. . .
• Colleen Hughes (’06)
• Pam Arbisi (’07)
• Rachel Grotheer (’08)
• Sam Berhend (’09)
• Clay Crocker and Matt Gibson (’13)
• Anderson Research Endowment
Lew Ludwig Straight-edge links and knots