Projective Joint Spectra and Characters of representations of An

Abstract

For a tuple of square complex-valued N× N matrices A1,…,An the determinant of their linear combination x1A1+·s +xnAn, which is called a pencil, is a homogeneous polynomial of degree N in [x1,...xn]. Zero-set of this polynomial is an algebraic set in the projective space n-1. This set is called the determinantal hypersurface or determinantal manifold of the tuple (A1,...,An). It was shown in Cuckovic, Stessin, Tchernev (2021) that if G is a non-special Coxeter group of type A,B, or D, 1 and 2 are two linear representations of G, and the determinantal hypersurfaces of images of the Coxeter generators of G under 1 and 2 coincide as divisors in the projective space, the characters of 1 and 2 are equal, and, therefore, 1 and 2 are equivalent. In Peebles, Stessin, Tchernev (in preparation) this result was extended in the characters part to affine Coxeter groups of types B,C, and D. It was shown there that each such group contains a finite subset such that, if the determinantal hypersurfaces of the images of this set under two finite-dimensional representations coincide as divisors in the projective space, the characters of these representations are equal. Notably, the affine Coxeter groups of A type are not covered by this result, as their combinatorics is quite different.mIn this paper we explicitly construct a finite set in An having the same property. We also show that every group which is a semidirect product of a fine group and a finitely generated abelian group contains a finite subset with the similar property: for every finite-dimensonal representation of the group, the determinantal hypersurface of images of the set determines the representation character.

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