Minimal bandwidth C*-actions on generalized Grassmannians

Abstract

The bandwidth of a C*-action of a polarized pair (X,L) is a natural measure of its complexity. In this paper we study C*-actions on rational homogeneous spaces, determining which provide minimal bandwidth. We prove that the minimal bandwidth is linked to the smallest coefficient of the fundamental weight, in a base of simple roots, which describes the variety as a marked Dynkin diagram. As a direct application of the results we study the Chow ring of the Cayley plane E6(6).