Equivariant K-theory classes of matrix orbit closures

Abstract

The group G = GLr(k) × (k×)n acts on Ar × n, the space of r-by-n matrices: GLr(k) acts by row operations and (k×)n scales columns. A matrix orbit closure is the Zariski closure of a point orbit for this action. We prove that the class of such an orbit closure in G equivariant K-theory of Ar × n is determined by the matroid of a generic point. We present two formulas for this class. The key to the proof is to show that matrix orbit closures have rational singularities.