Tilting modules arising from knot invariants

Abstract

We construct tilting modules over Jacobian algebras arising from knots. To a two-bridge knot L[a1,…,an], we associate a quiver Q with potential and its Jacobian algebra A. We construct a family of canonical indecomposable A-modules M(i), each supported on a different specific subquiver Q(i) of Q. Each of the M(i) is expected to parametrize the Jones polynomial of the knot. We study the direct sum M=iM(i) of these indecomposables inside the module category of A 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 a1,a2. We show that the module M is rigid and τ-rigid, and we construct a completion of M to a tilting (and τ-tilting) A-module T. We show that the endomorphism algebra EndAT of T is isomorphic to A, and that the mapping T A[1] induces a cluster automorphism of the cluster algebra A(Q). This automorphism is of order two. Moreover, we give a mutation sequence that realizes the cluster automorphism. In particular, we show that the quiver Q is mutation equivalent to an acyclic quiver of type Tp,q,r (a tree with three branches). This quiver is of finite type if (a1,a2)=(a1,2), (1,a2), or (2,3), it is tame for (a1,a2)=(2,4) or (3,3), and wild otherwise.