Quiver Grassmannians associated to nilpotent cyclic representations defined by single matrix

Abstract

In the present paper we study the geometry of the closed Biaynicki-Birula cells of the quiver Grassmannians associated to a nilpotent representation of a cyclic quiver defined by a single matrix. For the special case, where we choose subrepresentations of dimension 1=(1,…,1), the main result of this paper is that the closed Biaynicki-Birula cells are smooth. We also discuss the multiplicative structure of the cohomology ring of such spaces. Namely, we describe the so-called Knutson-Tao basis in context to the basis of equivariant cohomology that is dual to fundamental classes in equivariant homology.