Equivariant classes of matrix matroid varieties

Abstract

Consider an integer associated with every subset of the set of columns of an n× k matrix. The collection of those matrices for which the rank of a union of columns is the predescribed integer for every subset, will be denoted by XC. We study the equivariant cohomology class represented by the Zariski closure YC of this set. We show that the coefficients of this class are solutions to problems in enumerative geometry, which are natural generalization of the linear Gromov-Witten invariants of projective spaces. We also show how to calculate these classes and present their basic properties.