Geometric representations of finite groups on real toric spaces

Abstract

We develop a framework to construct geometric representations of finite groups G through the correspondence between real toric spaces X R and simplicial complexes with characteristic matrices. We give a combinatorial description of the G-module structure of the homology of X R. As applications, we make explicit computations of the Weyl group representations on the homology of real toric varieties associated to the Weyl chambers of type A and B, which show an interesting connection to the topology of posets. We also realize a certain kind of Foulkes representation geometrically as the homology of real toric varieties.