The HOMFLY-PT Polynomial: Difference between revisions

Latest revision as of 20:56, 8 August 2013

KnotTheory`/Navigation

The Mathematica Package KnotTheory`

The HOMFLY-PT polynomial $H(L)(a,z)$ (see [HOMFLY] and [PT]) of a knot or link $L$ is defined by the skein relation

Failed to parse (unknown function "\overcrossing"): {\displaystyle aH\left(\overcrossing\right)-a^{-1}H\left(\undercrossing\right)=zH\left(\smoothing\right) }

and by the initial condition $H(\bigcirc )$ =1.

KnotTheory` knows about the HOMFLY-PT polynomial:

(For In[1] see Setup)

In[2]:=	?HOMFLYPT
HOMFLYPT[K][a, z] computes the HOMFLY-PT (Hoste, Ocneanu, Millett, Freyd, Lickorish, Yetter, Przytycki and Traczyk) polynomial of a knot/link K, in the variables a and z.

In[3]:=	HOMFLYPT::about
The HOMFLYPT program was written by Scott Morrison.

Thus, for example, here's the HOMFLY-PT polynomial of the knot 8_1:

In[4]:= K = Knot[8, 1];

`In[5]:=`	`HOMFLYPT[Knot[8, 1]][a, z]`
`Out[5]=`	`-2 4 6 2 2 2 4 2 a - a + a - z - a z - a z`

It is well known that HOMFLY-PT polynomial specializes to the Jones polynomial at $a=q^{-1}$ and $z=q^{1/2}-q^{-1/2}$ and to the Conway polynomial at $a=1$ . Indeed,

`In[6]:=`	`Expand[HOMFLYPT[K][1/q, Sqrt[q]-1/Sqrt[q]]]`
`Out[6]=`	`-6 -5 -4 2 2 2 2 2 + q - q + q - -- + -- - - - q + q 3 2 q q q`

`In[7]:=`	`Jones[K][q]`
`Out[7]=`	`-6 -5 -4 2 2 2 2 2 + q - q + q - -- + -- - - - q + q 3 2 q q q`

`In[8]:=`	`{HOMFLYPT[K][1, z], Conway[K][z]}`
`Out[8]=`	`2 2 {1 - 3 z , 1 - 3 z }`

8_1

L5a1

In our parametrization of the $A_{2}$ link invariant, it satisfies

A_{2}(L)(q)=(-1)^{c}(q^{2}+1+q^{-2})H(L)(q^{-3},\,q-q^{-1})

,

where $L$ is some knot or link and where $c$ is the number of components of $L$ . Let us verify this fact for the Whitehead link, L5a1:

In[9]:= L = Link[5, Alternating, 1];

`In[10]:=`	`Simplify[{ (-1)^(Length[Skeleton[L]]-1)(q^2+1+1/q^2)HOMFLYPT[L][1/q^3, q-1/q], A2Invariant[L][q] }]`
`Out[10]=`	`-12 -8 -6 2 -2 2 4 6 {2 - q + q + q + -- + q + q + q + q , 4 q -12 -8 -6 2 -2 2 4 6 2 - q + q + q + -- + q + q + q + q } 4 q`

Other Software to Compute the HOMFLY-PT Polynomial

A C-based program running under windows by M. Ochiai can compute the HOMFLY-PT polynomial of certain knots and links with up to hundreds of crossings using "base tangle decompositions". His program, bTd, is available at [1].

References

[HOMFLY] ^ J. Hoste, A. Ocneanu, K. Millett, P. Freyd, W. B. R. Lickorish and D. Yetter, A new polynomial invariant of knots and links, Bull. Amer. Math. Soc. 12 (1985) 239-246.

[PT] ^ J. Przytycki and P. Traczyk, Conway Algebras and Skein Equivalence of Links, Proc. Amer. Math. Soc. 100 (1987) 744-748.

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 The ''HOMFLY-PT polynomial'' <math>H(L)(a,z)</math> (see {{ref|HOMFLY}} and {{ref|PT}}) of a knot or link <math>L</math> is defined by the skein relation
@@ Line 15: / Line 15: @@
 <!--Robot Land, no human edits to "END"-->
 {{HelpAndAbout|
-n  = 1 |
+n  = 2 |
-n1 = 2 |
+n1 = 3 |
 in = <nowiki>HOMFLYPT</nowiki> |
 out= <nowiki>HOMFLYPT[K][a, z] computes the HOMFLY-PT (Hoste, Ocneanu, Millett, Freyd, Lickorish, Yetter, Przytycki and Traczyk) polynomial of a knot/link K, in the variables a and z.</nowiki> |
@@ Line 26: / Line 26: @@
 <!--Robot Land, no human edits to "END"-->
 {{In|
-n  = 3 |
+n  = 4 |
 in = <nowiki>K = Knot[8, 1];</nowiki>}}
 <!--END-->
@@ Line 33: / Line 33: @@
 <!--Robot Land, no human edits to "END"-->
 {{InOut|
-n  = 4 |
+n  = 5 |
 in = <nowiki>HOMFLYPT[Knot[8, 1]][a, z]</nowiki> |
 out= <nowiki> -2    4    6    2    2  2    4  2
-a   - a    a  - z  - a  z  - a  z</nowiki>}}
+a   - a  + a  - z  - a  z  - a  z</nowiki>}}
 <!--END-->
@@ Line 44: / Line 44: @@
 <!--Robot Land, no human edits to "END"-->
 {{InOut|
-n  = 5 |
+n  = 6 |
 in = <nowiki>Expand[HOMFLYPT[K][1/q, Sqrt[q]-1/Sqrt[q]]]</nowiki> |
 out= <nowiki>     -6    -5    -4   2    2    2        2
-q   - q     q   - --   -- - - - q   q
++ q   - q   + q   - -- + -- - - - q + q
 2   q
                       q    q</nowiki>}}
@@ Line 55: / Line 55: @@
 <!--Robot Land, no human edits to "END"-->
 {{InOut|
-n  = 6 |
+n  = 7 |
 in = <nowiki>Jones[K][q]</nowiki> |
 out= <nowiki>     -6    -5    -4   2    2    2        2
-q   - q     q   - --   -- - - - q   q
++ q   - q   + q   - -- + -- - - - q + q
 2   q
                       q    q</nowiki>}}
@@ Line 66: / Line 66: @@
 <!--Robot Land, no human edits to "END"-->
 {{InOut|
-n  = 7 |
+n  = 8 |
 in = <nowiki>{HOMFLYPT[K][1, z], Conway[K][z]}</nowiki> |
 out= <nowiki>        2         2
@@ Line 76: / Line 76: @@
 In our parametrization of the <math>A_2</math> link invariant, it satisfies
-<center><math>A_2(L)(q) = (-1)^c(q^2 1 q^{-2})H(L)(q^{-3},\,q-q^{-1})</math>,</center>
+<center><math>A_2(L)(q) = (-1)^c(q^2+1+q^{-2})H(L)(q^{-3},\,q-q^{-1})</math>,</center>
 where <math>L</math> is some knot or link and where <math>c</math> is the number of components of <math>L</math>. Let us verify this fact for the Whitehead link, [[L5a1]]:
@@ Line 83: / Line 83: @@
 <!--Robot Land, no human edits to "END"-->
 {{In|
-n  = 8 |
+n  = 9 |
 in = <nowiki>L = Link[5, Alternating, 1];</nowiki>}}
 <!--END-->
 <!--$$Simplify[{
-  (-1)^(Length[Skeleton[L]]-1)(q^2 1 1/q^2)HOMFLYPT[L][1/q^3, q-1/q],
+  (-1)^(Length[Skeleton[L]]-1)(q^2+1+1/q^2)HOMFLYPT[L][1/q^3, q-1/q],
   A2Invariant[L][q]
 }]$$-->
 <!--Robot Land, no human edits to "END"-->
 {{InOut|
-n  = 9 |
+n  = 10 |
 in = <nowiki>Simplify[{
-  (-1)^(Length[Skeleton[L]]-1)(q^2 1 1/q^2)HOMFLYPT[L][1/q^3, q-1/q],
+  (-1)^(Length[Skeleton[L]]-1)(q^2+1+1/q^2)HOMFLYPT[L][1/q^3, q-1/q],
   A2Invariant[L][q]
 }]</nowiki> |
 out= <nowiki>      -12    -8    -6   2     -2    2    4    6
-{2 - q      q     q     --   q     q    q    q ,
+{2 - q    + q   + q   + -- + q   + q  + q  + q ,
                         q
        -12    -8    -6   2     -2    2    4    6
-- q      q     q     --   q     q    q    q }
+- q    + q   + q   + -- + q   + q  + q  + q }
                          q</nowiki>}}
@@ Line 116: / Line 116: @@
 {{note|HOMFLY}} J. Hoste, A. Ocneanu, K. Millett, P. Freyd, W. B. R. Lickorish and D. Yetter, ''A new polynomial invariant of knots and links'', Bull. Amer. Math. Soc. '''12''' (1985) 239-246.
-{{note|PT}} J. Przytycki and P. Traczyk, <math>Conway Algebras and Skein Equivalence of Links</math>,  Proc. Amer. Math. Soc. '''100''' (1987) 744-748.
+{{note|PT}} J. Przytycki and P. Traczyk, ''Conway Algebras and Skein Equivalence of Links'',  Proc. Amer. Math. Soc. '''100''' (1987) 744-748.

The HOMFLY-PT Polynomial: Difference between revisions

Latest revision as of 20:56, 8 August 2013

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