Rigid toric matrix Schubert varieties

Abstract

For a given permutation π ∈ SN, Fulton proves that the matrix Schubert variety Xπ Yπ × Cq can be defined via certain rank conditions encoded in the Rothe diagram of π. In the case where Yπ:=TV(σπ) is toric (with respect to a (C*)2N-1 action), we show that it can be described as an edge ideal of a bipartite graph Gπ. We characterize the lower dimensional faces of the associated so-called edge cone σπ explicitly in terms of subgraphs of Gπ and present a combinatorial study for the first order deformations of Yπ. We prove that Yπ is rigid if and only if the three-dimensional faces of σπ are all simplicial. Moreover, we reformulate this result in terms of Rothe diagram of π.