Characteristic polynomials and some combinatorics for finite Coxeter groups

Abstract

Let W be a finite Coxeter group with Coxeter generating set S=\s1,…,sn\, and be a complex finite dimensional representation of W. The characteristic polynomial of is defined as equation* d(S,)=[x0I+x1(s1)+·s+xn(sn)], equation* where I is the identity operator. In this paper, we show the existence of a combinatorics structure within W, and thereby prove that for any two complex finite dimensional representations 1 and 2 of W, d(S,1)=d(S,2) if and only if 1 2.

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