Drawing Planar Diagrams: Difference between revisions

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DrawPD was written by Emily Redelmeier at the University of Toronto in the summers of 2003 and 2004.
DrawPD was written by Emily Redelmeier at the University of Toronto in the summers of 2003 and 2004.
{{HelpAndAbout3}}
{{HelpAndAbout3}}
<!--END-->

Thus, for example, here's the torus knot [[T(4,3)]]:

<!--$$Show[DrawPD[TorusKnot[4, 3]]]$$-->
<!--END-->

One problem we currently have is that crossings come out at non-uniform sizes, hence in the picture below you may need magnifying glasses to decide who's over and who's under:

<!--$$MillettUnknot = PD[
X[1,10,2,11], X[9,2,10,3], X[3,7,4,6], X[15,5,16,4], X[5,17,6,16],
X[7,14,8,15], X[8,18,9,17], X[11,18,12,19], X[19,12,20,13], X[13,20,14,1]
];$$-->
<!--END-->

<!--$$Show[DrawPD[MillettUnknot]]$$-->
<!--END-->
<!--END-->

Revision as of 15:23, 24 August 2005


My summer student Emily Redelmeier is in the process of writing a program that uses circle packing to draw an arbitrary object given as a PD as in Planar Diagrams. At the moment her program is still slow, limited and sometimes buggy, but it is already quite useful, as the following lines show:

(For In[1] see Setup)

In[2]:= ?DrawPD

DrawPD[pd] takes the planar diagram description pd and creates a graphics object containing a picture of the knot. DrawPD[pd,options], where options is a list of rules, allows the user to control some of the parameters. OuterFace->n sets the face at infinity to the face numbered n. OuterFace->{e_1,e_2,...,e_n} sets the face at infinity to a face which has edges e_1, e_2, ..., e_n in the planar diagram description. Gap->g sets the size of the gap around a crossing to length g.

In[3]:= DrawPD::about

DrawPD was written by Emily Redelmeier at the University of Toronto in the summers of 2003 and 2004.

Thus, for example, here's the torus knot T(4,3):


One problem we currently have is that crossings come out at non-uniform sizes, hence in the picture below you may need magnifying glasses to decide who's over and who's under: