K11a359

(Knotscape image)	See the full Hoste-Thistlethwaite Table of 11 Crossing Knots. Visit K11a359 at Knotilus!
	[edit K11a359 Quick Notes]

[edit K11a359 Further Notes and Views]

Knot presentations

Planar diagram presentation	X₈₂₉₁ X_14,4,15,3 X_16,6,17,5 X_18,8,19,7 X_22,10,1,9 X_20,12,21,11 X_2,14,3,13 X_6,16,7,15 X_4,18,5,17 X_12,20,13,19 X_10,22,11,21
Gauss code	1, -7, 2, -9, 3, -8, 4, -1, 5, -11, 6, -10, 7, -2, 8, -3, 9, -4, 10, -6, 11, -5
Dowker-Thistlethwaite code	8 14 16 18 22 20 2 6 4 12 10

A Braid Representative

A Morse Link Presentation

Three dimensional invariants

Symmetry type	Reversible
Unknotting number	$\{2,3\}$
3-genus	2
Bridge index	2
Super bridge index	Missing
Nakanishi index	Missing
Maximal Thurston-Bennequin number	Data:K11a359/ThurstonBennequinNumber
Hyperbolic Volume	9.67188
A-Polynomial	See Data:K11a359/A-polynomial

[edit Notes for K11a359's three dimensional invariants]

Four dimensional invariants

Smooth 4 genus	Missing
Topological 4 genus	Missing
Concordance genus	$2$
Rasmussen s-Invariant	-4

[edit Notes for K11a359's four dimensional invariants]

Polynomial invariants

Alexander polynomial	$6t^{2}-13t+15-13t^{-1}+6t^{-2}$
Conway polynomial	$6z^{4}+11z^{2}+1$
2nd Alexander ideal (db, data sources)	$\{1\}$
Determinant and Signature	{ 53, 4 }
Jones polynomial	$-q^{13}+q^{12}-3q^{11}+5q^{10}-6q^{9}+8q^{8}-8q^{7}+8q^{6}-6q^{5}+4q^{4}-2q^{3}+q^{2}$
HOMFLY-PT polynomial (db, data sources)	$z^{4}a^{-4}+2z^{4}a^{-6}+2z^{4}a^{-8}+z^{4}a^{-10}+2z^{2}a^{-4}+4z^{2}a^{-6}+4z^{2}a^{-8}+2z^{2}a^{-10}-z^{2}a^{-12}+a^{-6}+a^{-8}+a^{-10}-2a^{-12}$
Kauffman polynomial (db, data sources)	$z^{10}a^{-10}+z^{10}a^{-12}+2z^{9}a^{-9}+3z^{9}a^{-11}+z^{9}a^{-13}+3z^{8}a^{-8}-3z^{8}a^{-10}-5z^{8}a^{-12}+z^{8}a^{-14}+3z^{7}a^{-7}-6z^{7}a^{-9}-13z^{7}a^{-11}-3z^{7}a^{-13}+z^{7}a^{-15}+3z^{6}a^{-6}-9z^{6}a^{-8}+6z^{6}a^{-10}+14z^{6}a^{-12}-4z^{6}a^{-14}+2z^{5}a^{-5}-6z^{5}a^{-7}+9z^{5}a^{-9}+23z^{5}a^{-11}-6z^{5}a^{-15}+z^{4}a^{-4}-6z^{4}a^{-6}+14z^{4}a^{-8}-7z^{4}a^{-10}-25z^{4}a^{-12}+3z^{4}a^{-14}-3z^{3}a^{-5}+6z^{3}a^{-7}-4z^{3}a^{-9}-21z^{3}a^{-11}+3z^{3}a^{-13}+11z^{3}a^{-15}-2z^{2}a^{-4}+5z^{2}a^{-6}-6z^{2}a^{-8}+2z^{2}a^{-10}+16z^{2}a^{-12}+z^{2}a^{-14}+5za^{-11}-za^{-13}-6za^{-15}-a^{-6}+a^{-8}-a^{-10}-2a^{-12}$
The A2 invariant	Data:K11a359/QuantumInvariant/A2/1,0
The G2 invariant	Data:K11a359/QuantumInvariant/G2/1,0

Further Quantum Invariants

K11a359 Quantum Invariants.

Computer Talk

The above data is available with the Mathematica package KnotTheory`, as shown in the (simulated) Mathematica session below. Your input (in red) is realistic; all else should have the same content as in a real mathematica session, but with different formatting. This Mathematica session is also available (albeit only for the knot 5_2) as the notebook PolynomialInvariantsSession.nb.

(The path below may be different on your system, and possibly also the KnotTheory` date)

In[1]:= AppendTo[$Path, "C:/drorbn/projects/KAtlas/"]; << KnotTheory`

Loading KnotTheory` version of August 31, 2006, 11:25:27.5625.

In[3]:= K = Knot["K11a359"];

In[4]:= Alexander[K][t]

KnotTheory::loading: Loading precomputed data in PD4Knots`.

Out[4]= $6t^{2}-13t+15-13t^{-1}+6t^{-2}$

In[5]:= Conway[K][z]

Out[5]= $6z^{4}+11z^{2}+1$

In[6]:= Alexander[K, 2][t]

KnotTheory::credits: The program Alexander[K, r] to compute Alexander ideals was written by Jana Archibald at the University of Toronto in the summer of 2005.

Out[6]= $\{1\}$

In[7]:= {KnotDet[K], KnotSignature[K]}

Out[7]= { 53, 4 }

In[8]:= Jones[K][q]

KnotTheory::loading: Loading precomputed data in Jones4Knots`.

Out[8]= $-q^{13}+q^{12}-3q^{11}+5q^{10}-6q^{9}+8q^{8}-8q^{7}+8q^{6}-6q^{5}+4q^{4}-2q^{3}+q^{2}$

In[9]:= HOMFLYPT[K][a, z]

KnotTheory::credits: The HOMFLYPT program was written by Scott Morrison.

Out[9]= $z^{4}a^{-4}+2z^{4}a^{-6}+2z^{4}a^{-8}+z^{4}a^{-10}+2z^{2}a^{-4}+4z^{2}a^{-6}+4z^{2}a^{-8}+2z^{2}a^{-10}-z^{2}a^{-12}+a^{-6}+a^{-8}+a^{-10}-2a^{-12}$

In[10]:= Kauffman[K][a, z]

KnotTheory::loading: Loading precomputed data in Kauffman4Knots`.

Out[10]= $z^{10}a^{-10}+z^{10}a^{-12}+2z^{9}a^{-9}+3z^{9}a^{-11}+z^{9}a^{-13}+3z^{8}a^{-8}-3z^{8}a^{-10}-5z^{8}a^{-12}+z^{8}a^{-14}+3z^{7}a^{-7}-6z^{7}a^{-9}-13z^{7}a^{-11}-3z^{7}a^{-13}+z^{7}a^{-15}+3z^{6}a^{-6}-9z^{6}a^{-8}+6z^{6}a^{-10}+14z^{6}a^{-12}-4z^{6}a^{-14}+2z^{5}a^{-5}-6z^{5}a^{-7}+9z^{5}a^{-9}+23z^{5}a^{-11}-6z^{5}a^{-15}+z^{4}a^{-4}-6z^{4}a^{-6}+14z^{4}a^{-8}-7z^{4}a^{-10}-25z^{4}a^{-12}+3z^{4}a^{-14}-3z^{3}a^{-5}+6z^{3}a^{-7}-4z^{3}a^{-9}-21z^{3}a^{-11}+3z^{3}a^{-13}+11z^{3}a^{-15}-2z^{2}a^{-4}+5z^{2}a^{-6}-6z^{2}a^{-8}+2z^{2}a^{-10}+16z^{2}a^{-12}+z^{2}a^{-14}+5za^{-11}-za^{-13}-6za^{-15}-a^{-6}+a^{-8}-a^{-10}-2a^{-12}$

"Similar" Knots (within the Atlas)

Same Alexander/Conway Polynomial: {}

Same Jones Polynomial (up to mirroring, $q\leftrightarrow q^{-1}$ ): {}

Computer Talk

The above data is available with the Mathematica package KnotTheory`. Your input (in red) is realistic; all else should have the same content as in a real mathematica session, but with different formatting.

(The path below may be different on your system, and possibly also the KnotTheory` date)

In[1]:= AppendTo[$Path, "C:/drorbn/projects/KAtlas/"]; << KnotTheory`

Loading KnotTheory` version of May 31, 2006, 14:15:20.091.

In[3]:= K = Knot["K11a359"];

In[4]:= {A = Alexander[K][t], J = Jones[K][q]}

KnotTheory::loading: Loading precomputed data in PD4Knots`.

KnotTheory::loading: Loading precomputed data in Jones4Knots`.

Out[4]= { $6t^{2}-13t+15-13t^{-1}+6t^{-2}$ , $-q^{13}+q^{12}-3q^{11}+5q^{10}-6q^{9}+8q^{8}-8q^{7}+8q^{6}-6q^{5}+4q^{4}-2q^{3}+q^{2}$ }

In[5]:= DeleteCases[Select[AllKnots[], (A === Alexander[#][t]) &], K]

KnotTheory::loading: Loading precomputed data in DTCode4KnotsTo11`.

KnotTheory::credits: The GaussCode to PD conversion was written by Siddarth Sankaran at the University of Toronto in the summer of 2005.

Out[5]= {}

In[6]:= DeleteCases[ Select[ AllKnots[], (J === Jones[#][q] || (J /. q -> 1/q) === Jones[#][q]) & ], K ]

KnotTheory::loading: Loading precomputed data in Jones4Knots11`.

Out[6]= {}

Vassiliev invariants

V₂ and V₃:

(11, 36)

V_2,1 through V_6,9:

V_2,1

V_3,1

V_4,1

V_4,2

V_4,3

V_5,1

V_5,2

V_5,3

V_5,4

V_6,1

V_6,2

V_6,3

V_6,4

V_6,5

V_6,6

V_6,7

V_6,8

V_6,9

44

288

968

{\frac {7450}{3}}

{\frac {1286}{3}}

12672

23392

4160

3584

{\frac {42592}{3}}

41472

{\frac {327800}{3}}

{\frac {56584}{3}}

{\frac {6676661}{30}}

-{\frac {3294}{5}}

{\frac {4380202}{45}}

{\frac {30955}{18}}

{\frac {405461}{30}}

V_2,1 through V_6,9 were provided by Petr Dunin-Barkowski <barkovs@itep.ru>, Andrey Smirnov <asmirnov@itep.ru>, and Alexei Sleptsov <sleptsov@itep.ru> and uploaded on October 2010 by User:Drorbn. Note that they are normalized differently than V₂ and V₃.

Khovanov Homology

The coefficients of the monomials

t^{r}q^{j}

are shown, along with their alternating sums

\chi

(fixed

j

, alternation over

r

). The squares with yellow highlighting are those on the "critical diagonals", where

j-2r=s+1

or

j-2r=s-1

, where

s=

4 is the signature of K11a359. Nonzero entries off the critical diagonals (if any exist) are highlighted in red.

\		r
	\
j		\

0

1

2

3

4

5

6

7

8

9

10

11

χ

27

1

-1

25

0

23

3

1

-2

21

2

19

4

3

-1

17

4

2

15

4

0

13

4

0

11

2

4

2

9

2

4

-2

7

2

5

1

2

-1

3

1

Integral Khovanov Homology

(db, data source)

$\dim {\mathcal {G}}_{2r+i}\operatorname {KH} _{\mathbb {Z} }^{r}$	$i=3$	$i=5$
$r=0$	${\mathbb {Z} }$	${\mathbb {Z} }$
$r=1$	${\mathbb {Z} }^{2}$
$r=2$	${\mathbb {Z} }^{2}\oplus {\mathbb {Z} }_{2}^{2}$	${\mathbb {Z} }^{2}$
$r=3$	${\mathbb {Z} }^{4}\oplus {\mathbb {Z} }_{2}^{2}$	${\mathbb {Z} }^{2}$
$r=4$	${\mathbb {Z} }^{4}\oplus {\mathbb {Z} }_{2}^{4}$	${\mathbb {Z} }^{4}$
$r=5$	${\mathbb {Z} }^{4}\oplus {\mathbb {Z} }_{2}^{4}$	${\mathbb {Z} }^{4}$
$r=6$	${\mathbb {Z} }^{4}\oplus {\mathbb {Z} }_{2}^{4}$	${\mathbb {Z} }^{4}$
$r=7$	${\mathbb {Z} }^{2}\oplus {\mathbb {Z} }_{2}^{4}$	${\mathbb {Z} }^{4}$
$r=8$	${\mathbb {Z} }^{3}\oplus {\mathbb {Z} }_{2}^{2}$	${\mathbb {Z} }^{2}$
$r=9$	${\mathbb {Z} }_{2}^{3}$	${\mathbb {Z} }^{3}$
$r=10$	${\mathbb {Z} }$
$r=11$	${\mathbb {Z} }_{2}$	${\mathbb {Z} }$