Volume Conjecture: Refined and Categorified
Abstract
The generalized volume conjecture relates asymptotic behavior of the colored Jones polynomials to objects naturally defined on an algebraic curve, the zero locus of the A-polynomial . Another "family version" of the volume conjecture depends on a quantization parameter, usually denoted or ; this quantum volume conjecture (also known as the AJ-conjecture) can be stated in a form of a q-difference equation that annihilates the colored Jones polynomials and Chern-Simons partition functions. We propose refinements / categorifications of both conjectures that include an extra deformation parameter and describe similar properties of homological knot invariants and refined BPS invariants. Much like their unrefined / decategorified predecessors, that correspond to , the new volume conjectures involve objects naturally defined on an algebraic curve obtained by a particular deformation of the A-polynomial, and its quantization . We compute both classical and quantum t-deformed curves in a number of examples coming from colored knot homologies and refined BPS invariants.
Cite
@article{arxiv.1203.2182,
title = {Volume Conjecture: Refined and Categorified},
author = {Hiroyuki Fuji and Sergei Gukov and Piotr Sułkowski},
journal= {arXiv preprint arXiv:1203.2182},
year = {2017}
}
Comments
with an appendix by Hidetoshi Awata; 92 pages, 24 figures