Kauffman bracket intertwiners and the volume conjecture
- Resource Type
- Working Paper
- Authors
- Wang, Zhihao
- Source
- Subject
- Mathematics - Algebraic Topology
Mathematics - Geometric Topology
- Language
Bonahon-Wong-Yang introduced a new version of the volume conjecture by using the intertwiners between two isomorphic irreducible representations of the skein algebra.The intertwiners are built from surface diffeomorphisms; they made the volume conjecture when diffeomorphisms are pseudo-Anosov. In this paper we calculated all the intertwiners for the closed torus, producing some interesting results. Moreover we considered the periodic diffeomorphisms, and introduced the corresponding conjecture. For some special cases we made precise calculations for intertwiners and proved our conjecture.