Gr\"obner Cones for Finite Type Cluster Algebras

Abstract

Let A be a cluster algebra of finite cluster type. We study the Gr\"obner cone CA parametrizing term orders inducing an initial degeneration of the ideal IA of relations among the cluster variables of A to the ideal generated by products of incompatible cluster variables. We show that for any cluster variable v, the weight induced by taking compatibility degrees with v belongs to CA. This allows us to construct an explicit circular term order and prove a conjecture of Ilten, N\'ajera Ch\'avez, and Treffinger. Furthermore, we give explicit descriptions of the rays and lineality spaces of CA in terms of combinatorial models for cluster algebras of types An, Bn, Cn, Dn with a special choice of frozen variables, and in the case of no frozen variables.