Conway Notation: Difference between revisions
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<tt>KnotTheory`</tt> understands the Conway notation for knots and links (see {{ref|Conway}} and down below), though the conversion |
<tt>KnotTheory`</tt> understands the Conway notation for knots and links (see {{ref|Conway}} and down below), though the conversion |
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between Conway notation and other knot presentations known to <tt>KnotTheory`</tt> (a necessary first step for using most of the KnotTheory` functionnality) requires the packages ''K2K'' (KNOT 2000, by M.Ochiai and N.Imafuji) and ''LinKnot'' (by S. Jablan and R. Sazdanovic). |
between Conway notation and other knot presentations known to <tt>KnotTheory`</tt> (a necessary first step for using most of the KnotTheory` functionnality) requires the packages ''K2K'' (KNOT 2000, by M.Ochiai and N.Imafuji) and ''LinKnot'' (by S. Jablan and R. Sazdanovic). See [[Using the LinKnot package]] for more information. |
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{{Startup Note}} |
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After the installation, set the directory to LinKnot, add the path to KnotTheory, and from any nb-file run: |
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As in the section [[Using the LinKnot package]], the first step is to add ''LinKnot'' to the Mathematica search path. This path will likely be different on your computer. |
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SetDirectory["LinKnot Directory"]; |
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⚫ | |||
<< LinKnots` |
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<!--Robot Land, no human edits to "END"--> |
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{{In| |
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AppendTo[$Path, "Path to KnotTheory"]; |
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n = 2 | |
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in = <nowiki>AppendTo[$Path, "C:/bin/LinKnot/"];</nowiki>}} |
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<< KnotTheory` |
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<!--END--> |
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For example, if the directories KnotTheory and LinKnot are both at C: run |
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SetDirectory["C:\\LinKnot"]; |
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<< LinKnots` |
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⚫ | |||
<< KnotTheory` |
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Then you can work with the both programs ''KnotTheory'' and ''LinKnot''. |
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If you like to see the complete description of the program ''LinKnot'', open the file K2KL.nb from the directory LinKnot and run the programs in the same way. |
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<!--$$?ConwayNotation$$--> |
<!--$$?ConwayNotation$$--> |
Revision as of 13:33, 7 April 2006
Conway notation and KnotTheory`
KnotTheory` understands the Conway notation for knots and links (see [Conway] and down below), though the conversion between Conway notation and other knot presentations known to KnotTheory` (a necessary first step for using most of the KnotTheory` functionnality) requires the packages K2K (KNOT 2000, by M.Ochiai and N.Imafuji) and LinKnot (by S. Jablan and R. Sazdanovic). See Using the LinKnot package for more information.
(For In[1] see Setup)
As in the section Using the LinKnot package, the first step is to add LinKnot to the Mathematica search path. This path will likely be different on your computer.
In[2]:=
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AppendTo[$Path, "C:/bin/LinKnot/"];
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A well known example of a knot with an Alexander polynomial equal to the Alexander polynomial of the unknot is the (-3,5,7)-pretzel knot . Let us verify that, check (using the Jones polynomial that is not the unknot and find a (rather unattractive) braid whose closure is :
In[6]:=
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DrawMorseLink[K = ConwayNotation["-3,5,7"]] // Show
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Out[6]=
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-Graphics-
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In[7]:=
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Alexander[K][t]
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Out[7]=
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1
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In[8]:=
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Jones[K][q]
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Out[8]=
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-12 -11 -10 2 -8 -7 -5 -4 2 -2 1
q - q + q - -- + q - q + q - q + -- - q + -
9 3 q
q q
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In[9]:=
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br = BR[K]
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Out[9]=
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BR[14, {1, 2, 3, -4, -5, -6, -7, 8, -7, 6, 5, 4, -3, -2, -1, -6, -5,
-4, -3, -2, 9, 8, 7, 6, -5, 4, -3, 7, -8, -7, -9, -8, 10, 9, -8,
-11, -10, 12, 11, -10, 9, -8, -13, -12, -11, 10, 9, -8, -7, 6, -5,
4, -5, -7, 8, -7, -6, -7, -9, 8, -7, 6, 5, -4, 3, 2, -6, -7, -10,
-9, 11, 10, -9, 8, -7, 6, 5, -4, 3, -6, 5, 4, -6, 5, 7, 6, -7, -8,
9, 8, -7, 12, -11, 10, -9, 13, -12, 11, -10}]
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In[11]:=
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BraidPlot[br] // Show
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Out[11]=
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-Graphics-
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Some generalities about the Conway notation
Conway notation was introduced by J.H. Conway in 1967 (see [Conway]). The main building blocks for the Conway notation are 4-tangles. A 4-tangle in a knot or link projection is a region in the projection plane (or on the sphere ) surrounded with a circle such that the projection intersects with the circle exactly four times. The elementary tangles are:
Tangles could be combined and modified by one unary operation and three binary operations: sum, product and ramification, taking tangles , to new tangles , and . Here is the image of under reflection in the NW-SE mirror line, is obtained by placing and side by side with on the left and on the right. is simply , and finally, .
Sum and product of tangles | Ramification of tangles |
A rational tangle is any tangle obtained from the elementary tangles using only the operation of product. A rational knot or a rational link is the numerator closure of a rational tangle. A knot or link is called algebraic if it can be obtained as the closure of a tangle obtained from rational tangles using the operations above.
Knot or links that can not be obtained in this way are called non-algebraic. They can all be obtained in the following manner: start with a basic polyhedron , a 4-valent graph without digons, with vertices numbered through . Now substitute tangles through into these vertices.
The Conway notation for such knots and links consists of the symbol of a basic polyhedron where is the number of vertices and is the index of in some fixed list of basic polyhedra with vertices, followed by the symbols for the tangles through separated by dots.
For example, the knot 4_1 is denoted by "2 2", the knot 9_5 by "5 1 3", the link L5a1 is denoted by "2 1 2", the link L9a24 by "3 1,3,2" (all of them contain spaces between tangles), etc. A sequence of k pluses at the end of Conway symbol is denoted by +k, and the sequence of k minuses by +-k (e.g., knot 10_76 given in Conway notation as 3,3,2++ is denoted by "3,3,2+2", and the mirror of the link L9n21 whose Conway notation is 3,2,2,2-- is given by "3,2,2,2+-2"). The space is used in the same way in all other symbols.
For the basic polyhedra with crossings the standard notation is used (.1 , 6*, 8*, 9*, where the symbol for 6* can be ommitted). For example, the knot 10_95 is denoted by ".2 1 0.2.2", and 10_101 by "2 1..2..2". For higher values of it is used notation in which the first number is the number of crossings, and the next is the ordering number of polyhedron (e.g., 101*, 102*, 103* for denoting 10*, 10**, 10***, respectively, and 111*, 112*, 113* for denoting 11*, 11**, 11***, respectively, etc.).
The order of basic polyhedra for corresponds to the list in [Caudron], so as 121* till 1212* are denoted the basic polyhedra originally titled as 12A-12L. For the database of basic polyhedra is produced from the list of simple 4-regular 4-edge-connected but not 3-connected plane graphs generated by Brendan McKay using the program "plantri" written by Gunnar Brinkmann and Brendan McKay (http://cs.anu.edu.au/~bdm/plantri/). PolyBase.m is automatically downloaded and it cointains basic polyhedra up to 16 crossings. In order to work with the basic polyhedra up tp 20 vertices, one needs to open an additional database PolyBaseN.m, for to (by writing, e.g. <<PolyBase17.m or Needs["PolyBase17.m"] for ).
Note: Together with the classical notation, Conway symbols are given in the book Knots and Links by D.~Rolfsen. However if you try to draw some knots or links from their Conway symbols the obtained projection might be non-isomorphic with the one given in Rolfsen, for example knot 9_15 denoted in Conway notation as 2 3 2 2 gives projection with 5, and not 4 digons.
[Caudron] ^ A. Caudron, Classification des noeuds et des enlancements. Public. Math. d'Orsay 82. Orsay: Univ. Paris Sud, Dept. Math., 1982.
[Conway] ^ J. H. Conway, An Enumeration of Knots and Links, and Some of Their Algebraic Properties. In Computation Problems in Abstract Algebra (Ed. J. Leech). Oxford, England: Pergamon Press, pp. 329-358, 1967.