Triangulated monoidal categorifications of finite type cluster algebras

Abstract

We propose a framework of monoidal categorification of finite type cluster algebras involving triangulated monoidal categories. Namely, given a Dynkin quiver Q, we consider the bounded homotopy category KQ(1) of a symmetric monoidal category HQ(1) that we define in terms of the Auslander-Reiten theory of Q. Using some iterated mapping cone procedure, we construct a distinguished family \ C[β] \β ∈ + of chain complexes in KQ(1) characterized (up to isomorphism) by homological conditions similar to those of higher exact sequences appearing in the context of higher homological algebra. We then prove that the distinguished triangle in KQ(1) given by each mapping cone categorifies an exchange relation in the finite type cluster algebra AQ with initial exchange quiver Q (for a suitable choice of frozen variables). As a consequence, we obtain that for each positive root β, the Euler characteristic of C[β] coincides with the truncated q-character of the simple module L[β] in the HL category C(1) categorifying the cluster variable x[β] of AQ via Hernandez-Leclerc's monoidal categorification. Along the way, we establish a uniform formula for the dominant monomial of L[β] in all types An and Dn for arbitrary orientations (agreeing with Brito-Chari's results in type An).