Determinantal hypersurfaces and representations of Coxeter groups

Abstract

Given a finite generating set T=\g0,…, gn\ of a group G, and a representation of G on a Hilbert space V, we investigate how the geometry of the set D(T,)=\ [x0 : … : xn] ∈ C Pn Σ xi(gi) not invertible \ reflects the properties of . When V is finite-dimensional this is an algebraic hypersurface in C Pn. In the special case T=G and = the left regular representation of G, this hypersurface is defined by the group determinant, an object studied extensively in the founding work of Frobenius that lead to the creation of representation theory. We focus on the classic case when G is a finite Coxeter group, and make T by adding the identity element 1G to a Coxeter generating set for G. Under these assumptions we show in our first main result that if is the left regular representation, then D(T,) determines the isomorphism class of G. Our second main result is that if G is not of exceptional type, and is any finite dimensional representation, then D(T,) determines .