A Comparison of cluster algebra structures arising from i-boxes and Demazure weaves

Abstract

We compare two cluster algebras related to a positive element b in the braid group of finite ADE type. One is the localized bosonic extension AC(b) equipped with an initial seed arising from an admissible chain C of i-boxes, which is deeply connected to monoidal categorification. The other is the coordinate ring C[X(Δ i)] of the braid variety X(Δ i) equipped with an initial seed arising from a Demazure weave W, where i and Δ are expression sequences of b and the half twist Δ, respectively. We explicitly construct a Demazure weave WΔ(C) for each admissible chain C associated with i, and prove that there exists an algebra isomorphism φi AC(b)C[X(Δ i)] which is compatible with the two seeds arising from C and WΔ(C). Moreover, the isomorphism φi sends the PBW vectors pi,k ∈ AC(b) to the coordinates zk ∈ C[X(Δ i)] indexed by the letters of i. As applications, we investigate a connection between Demazure weaves and signed words via the i-boxes and interpret the isomorphism φi from the viewpoint of monoidal categorification using Hernandez--Leclerc categories.