Splicing braid varieties

Abstract

For a positive braid β ∈ Br+k, we consider the braid variety X(β). We define a family of open sets Ur, w in X(β), where w ∈ Sk is a permutation and r is a positive integer no greater than the length of β. For fixed r, the sets Ur, w form an open cover of X(β). We conjecture that Ur,w is given by the nonvanishing of some cluster variables in a single cluster for the cluster structure on C[X(β)] and that Ur,w admits a cluster structure given by freezing these variables. Moreover, we show that Ur, w is always isomorphic to the product of two braid varieties, and we conjecture that this isomorphism is quasi-cluster. In some important special cases, we are able to prove our conjectures.