The Kontsevich Integral for Knotted Trivalent Graphs

From Drorbn
Revision as of 15:22, 6 March 2007 by Drorbn (talk | contribs) (→‎The Good)
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)
Jump to navigationJump to search
In Preparation

The information below is preliminary and cannot be trusted! (v)

Abstract

We construct a (very) well-behaved invariant of knotted trivalent graphs using only the Kontsevich integral, in three steps.

Step 1 - The Naive Kontsevich Integral

07-1352 Kontsevich Integral.png

We define the "naive Kontsevich integral" of a knotted trivalent graph or a slice thereof as in the "standard" picture above, except generalized to graphs in the obvious manner.

The Good

  • It has a factorization property.
  • For the "braid-like" factors, it has invariance under horizontal deformations.
  • It is morally a universal finite type invariant.

The Bad

  • It is divergent.

Step 2 - The Renormalized Kontsevich Integral

07-1352 Renormalizing the Kontsevich Integral.png

After choosing a scale and an infinitesimal and using ideas from renormalization theory as practiced by quantum field theorists, we define the "renormalized Kontsevich integral" of a knotted trivalent graph or a slice thereof as summarized by the picture above.

The Good

  • It retains all the good properties of the naive Kontsevich integral.
  • It is convergent.
  • It is invariant under rigid motions of critical points and trivalent vertices.
  • It has sensible behaviour under vertical connect sum, delete and unzip operations.
  • It has a sensible behaviour under the changing of the scale , as follows from:

Claim. Let be distinct complex numbers and let be another complex number. Let be the (-strand) braid "rescaling braid" which is the image of the map defined by . Finally, in let be the "sum of all horizontal chords"; . Then up to normalization factors which we are getting right with probability for some small ,

.

The Bad

  • It is not invariant under non-rigid motions of vertices and critical points.

Step 3 - The Corrected Kontsevich Integral

07-1352 Correctors Corrections Syzygies.png

By correcting caps and cups with factors and , and the two types of trivalent vertices with factors and , we define the "corrected Kontsevich integral" of a knotted trivalent graph or a slice thereof. It has all the good properties we can wish for. The details still need to be worked out here!

Aside - The Relationship with Drinfel'd's KZ Associator

The Drinfel'd KZ associator is reproduced already by :

07-1352 Normalizing PhiKZ.png