English

Understanding the Kauffman bracket skein module

q-alg 2008-02-03 v1 Quantum Algebra

Abstract

The Kauffman bracket skein module K(M)K(M) of a 3-manifold MM is defined over formal power series in the variable hh by letting A=eh/4A=e^{h/4}. For a compact oriented surface FF, it is shown that K(F×I)K(F \times I) is a quantization of the \g\g-characters of the fundamental group of FF, corresponding to a geometrically defined Poisson bracket. Finite type invariants for unoriented knots and links are defined. Topologically free Kauffman bracket modules are shown to generate finite type invariants. It is shown for compact MM that K(M)K(M) can be generated as a module by cables on a finite set of knots. Moreover, if MM contains no incompressible surfaces, the module is finitely generated.

Keywords

Cite

@article{arxiv.q-alg/9604013,
  title  = {Understanding the Kauffman bracket skein module},
  author = {Doug Bullock and Charles Frohman and Joanna Kania-Bartoszynska},
  journal= {arXiv preprint arXiv:q-alg/9604013},
  year   = {2008}
}

Comments

LaTeX2e v1.2, customized document class jktr.cls (included), requires packages epsfig and amstex, 13 pages, 26 figures inserted repeatedly