Complexity of the Zero Set of a Matrix Schubert Ideal

Abstract

T-varieties are normal varieties equipped with an action of an algebraic torus T. When the action is effective, the complexity of a T-variety X is (X)-(T). Matrix Schubert varieties, introduced by Fulton in 1992, are T-varieties consisting of n × n matrices satisfying certain constraints on the ranks of their submatrices. In this paper, we focus on the complexity of certain torus-fixed affine subvarieties of matrix Schubert varieties. Concretely, given a matrix Schubert variety Xw where w∈ Sn, we study the complexity of Yw obtained by the decomposition Xw = Yw × Ck with k as large as possible. Building up from results by Escobar and Mészáros and Donten-Bury, Escobar, and Portakal, we show that for a fixed n, the complexity of Yw with respect to this action can be any integer between 0 and (n-1)(n-3), except 1.