Tilting modules arising from knot invariants
Abstract
We construct tilting modules over Jacobian algebras arising from knots. To a two-bridge knot , we associate a quiver with potential and its Jacobian algebra . We construct a family of canonical indecomposable -modules , each supported on a different specific subquiver of . Each of the is expected to parametrize the Jones polynomial of the knot. We study the direct sum of these indecomposables inside the module category of as well as in the cluster category. In this paper we consider the special case where the two-bridge knot is given by two parameters . We show that the module is rigid and -rigid, and we construct a completion of to a tilting (and -tilting) -module . We show that the endomorphism algebra of is isomorphic to , and that the mapping induces a cluster automorphism of the cluster algebra . This automorphism is of order two. Moreover, we give a mutation sequence that realizes the cluster automorphism. In particular, we show that the quiver is mutation equivalent to an acyclic quiver of type (a tree with three branches). This quiver is of finite type if or , it is tame for or , and wild otherwise.
Cite
@article{arxiv.2001.04004,
title = {Tilting modules arising from knot invariants},
author = {Ralf Schiffler and David Whiting},
journal= {arXiv preprint arXiv:2001.04004},
year = {2020}
}
Comments
18 pages, 5 Figures