180 lines
6.5 KiB
Plaintext
180 lines
6.5 KiB
Plaintext
knotkit is a C++ software package written by Cotton Seed
|
||
(cseed@math.princeton.edu) for computing some knot and manifold
|
||
invariants appearing in low-dimensional topology. Other contributors
|
||
include Josh Batson.
|
||
|
||
This is a slightly modified version of knotkit. It includes a periodicity
|
||
testing functionality based on the Przytycki's criterion in terms of
|
||
Jones polynomial and a periodicity criterion from the upcoming paper by
|
||
Maciej Borodzik, Anna Kosiorek and Wojciech Politarczyk.
|
||
|
||
TABLE OF CONTENTS
|
||
|
||
1. INTRO
|
||
2. BUILDING
|
||
3. USAGE
|
||
4. UPCOMING CHANGES
|
||
5. FOR DEVELOPERS
|
||
|
||
1. INTRO
|
||
|
||
In addition to accepting knot presentations in a variety of formats
|
||
(see usage below), knotkit contains the following tables of knot data:
|
||
|
||
* The Rolfsen knot tables through 10 crossings, extracted from
|
||
Bar-Natan's Mathematica package, KnotTheory`,
|
||
* The Hoste-Weeks-Thistlewaite knot tables through 16 crossings taken
|
||
from knotscape, and
|
||
* and the Morwen Thistlewaite hyperbolic link tables taken from
|
||
SnapPy.
|
||
|
||
This version of knotkit has support to compute the following
|
||
invariants:
|
||
|
||
* Khovanov homology
|
||
See:
|
||
M. Khovanov, A Categorification of the Jones Polynomial, Duke
|
||
Math. J. 101 (2000), 359--426, arXiv:math/9908171.
|
||
D. Bar-Natan, On Khovanov's Categorification of the Jones Polynomial,
|
||
Algebraic and Geometric Topology 2 (2002), 337--370.
|
||
|
||
* Szabo's geometric spectral sequence
|
||
Computing gss was the original motivation for writing knotkit. For
|
||
more information on gss, see:
|
||
Z. Szabo, A geometric spectral sequence in Khovanov homology,
|
||
arXiv:1010.4252, and
|
||
C. Seed, Computations of Szabo's Geometric Spectral Sequence in Khovanov
|
||
Homology, arXiv:1110.0735.
|
||
|
||
* The Batson-Seed link splitting spectral sequence
|
||
See:
|
||
J. Batson, C. Seed, A Link Splitting Spectral Sequence in Khovanov
|
||
Homology.
|
||
|
||
* The Lipshitz-Sarkar Steenrod square on Khovanov homology
|
||
See:
|
||
R. Lipshitz, S. Sarkar, A Khovanov Homotopy Type, arXiv:1112.3932.
|
||
R. Lipshitz, S. Sarkar, A Steenrod Square on Khovanov Homology,
|
||
arXiv:1204.5776.
|
||
|
||
* Bar-Natan's analogue of Lee homology
|
||
See:
|
||
E. S. Lee, An endomorphism of the Khovanov invariant, Adv. Math. 197
|
||
(2005), 2, 554–586, arXiv:math/0210213.
|
||
D. Bar-Natan, Khovanov’s homology for tangles and cobordisms,
|
||
Geom. Topol. 9 (2005), 1443–1499, arXiv:math/0410495.
|
||
R. Lipshitz, S. Sarkar, A refinement of Rasmussen's s-invariant,
|
||
arXiv:1206.3532.
|
||
|
||
* The s-invariant coming from Bar-Natan's analogue of Lee homology
|
||
In addition to the above references, see:
|
||
J. Rasmussen, Khovanov homology and the slice genus, Invent.
|
||
Math. 182 2 (2010), 419--447, arXiv:math/0402131.
|
||
R. Lipshitz, S. Sarkar, A refinement of Rasmussen's s-invariant,
|
||
arXiv:1206.3532.
|
||
|
||
2. BUILDING
|
||
|
||
To build knotkit on OS X, you will need the latest version of XCode
|
||
(available for free in the App Store) and the GNU multiple precision
|
||
arithmetic library (GMP). You can get GMP here:
|
||
|
||
http://gmplib.org/
|
||
|
||
knotkit also builds under Linux. In addition to GMP, you will need a
|
||
C++ compiler which supports C++11. I use LLVM clang, but knotkit
|
||
should build with a recent version of GCC.
|
||
|
||
knotkit doesn't have a sophisticated build system. To build knotkit,
|
||
just run:
|
||
|
||
make
|
||
|
||
from the knotkit source directory. This should build the executable
|
||
"kk". For instructions on invoking kk, see usage below. If you run
|
||
into a problem, please contact me: Cotton Seed
|
||
(cotton@math.princeton.edu).
|
||
|
||
3. USAGE
|
||
|
||
The usage message for kk is given below. This can also be obtained by
|
||
running "kk -h".
|
||
|
||
A note about output. The output for commands kh, gss, ls and lee is a
|
||
.tex file which renders the bigraded homology group or spectral
|
||
sequence. The output for the command sq2 matches the output for the
|
||
program written by Lipshitz-Sarkar and is suitable for loading into
|
||
Sage. The command s outputs a single line of text.
|
||
|
||
usage: %s <invariant> [options...] <link>
|
||
/home/wojtek/ownCloud/src/knotkit/kk
|
||
compute <invariant> for knot or link <link>
|
||
<invariant> can be one of:
|
||
kh: Khovanov homology
|
||
gss: Szabo's geometric spectral sequence
|
||
lsss: Batson-Seed link splitting spectral sequence
|
||
component weights are 0, 1, ..., m
|
||
sq2: Lipshitz-Sarkar Steenrod square on Z/2 Kh
|
||
output suitable for Sage
|
||
leess: spectral sequence coming from Bar-Natan analogue of Lee's
|
||
deformation of Khovanov's complex (whew!)
|
||
s: Rasmussen's s-invariant coming from lee
|
||
khp: computes Khovanov polynomial of a link
|
||
jones: computes Jones polynomial of a link
|
||
periodicity: uses periodicity criterion of Przytycki and
|
||
the criterion in terms of Khovanov polynomial
|
||
output:
|
||
kh, gss, lsss, leess: .tex file
|
||
sq2: text in Sage format
|
||
s, khp, jones, periodicity: text
|
||
options:
|
||
-r : compute reduced theory
|
||
-h : print this message
|
||
-o <file> : write output to <file>
|
||
(stdout is the default)
|
||
-f <field> : ground field (if applicable)
|
||
(Z2 is the default)
|
||
-v : verbose: report progress as the computation proceeds
|
||
-p : period when verifying periodicity, can be equal to
|
||
5,7,11,13,17 or 19
|
||
-t : type of periodicity test:
|
||
- Przytycki - Przytycki's periodicity test
|
||
- Kh - periodicity criterion in terms of Khovanov homology
|
||
- all - uses both criteria and tests for all prime
|
||
periods between 5 and 19
|
||
<field> can be one of:
|
||
Z2, Z3, Q
|
||
<link> can be one of:
|
||
- the unknot, e.g. U or unknot
|
||
- a torus knot, e.g. T(2,3)
|
||
- a Rolfsen table knot, e.g. 10_124
|
||
- a Hoste-Thistlethwaite-Weeks knot, e.g. 11a12 or 12n214
|
||
- a Morwen Thistlethwaite link, e.g. L8n9 or L13n8862
|
||
- a planar diagram, e.g.
|
||
PD[X[1, 4, 2, 5], X[3, 6, 4, 1], X[5, 2, 6, 3]] or
|
||
PD[[1, 4, 2, 5], [3, 6, 4, 1], [5, 2, 6, 3]]
|
||
- a Dowker-Thistlethwaite code, e.g.
|
||
DTCode[6,8,2,4],
|
||
DT[dadbcda] or
|
||
DT[{6, -8}, {-10, 12, -14, 2, -4}]
|
||
- a braid, e.g. BR[2, {-1, -1, -1}]
|
||
- disjoint union (juxtaposition), e.g. T(2,3) U
|
||
|
||
4. UPCOMING CHANGES
|
||
|
||
The following changes are currently planned:
|
||
|
||
* support for Z/p, p arbitrary prime and F(x) field of rational functions
|
||
* Roberts' totally twisted Khovanov homology
|
||
* the E^3 page of the twisted spectral sequence Kh(L) => \widehat{HF}(\Sigma_L)
|
||
* spectral sequences of PIDs: lsss over F[x], gss over Z
|
||
* maps induced by cobordisms
|
||
|
||
5. FOR DEVELOPERS
|
||
|
||
If you are interested in contributing to knotkit or using it for a new
|
||
application, please contact me: Cotton Seed
|
||
(cotton@math.princeton.edu). I am interested in developing knotkit to
|
||
be an open platform for performing computations arising in
|
||
low-dimensional topology.
|