Quantum torus methods for Kauffman bracket skein modules
Abstract
We investigate aspects of Kauffman bracket skein algebras of surfaces and modules of 3-manifolds using quantum torus methods. These methods come in two flavors: embedding the skein algebra into a quantum torus related to quantum Teichmuller space, or filtering the algebra and obtaining an associated graded algebra that is a monomial subalgebra of a quantum torus. We utilize the former method to generalize the Chebyshev homomorphism of Bonahon and Wong between skein algebras of surfaces to a Chebyshev-Frobenius homomorphism between skein modules of marked 3-manifolds, in the course of which we define a surgery theory, and whose image we show is either transparent or skew-transparent. The latter method is used to show that skein algebras of surfaces are maximal orders, which implies a refined unicity theorem, shows that -character varieties are normal, and suggests a conjecture on how this result may be utilized for topological quantum compiling.
Cite
@article{arxiv.1910.01676,
title = {Quantum torus methods for Kauffman bracket skein modules},
author = {Jonathan Paprocki},
journal= {arXiv preprint arXiv:1910.01676},
year = {2019}
}
Comments
PhD thesis. 167 pages, 35 figures