FIW-modules and constraints on classical Weyl group characters

Abstract

In this paper we study the characters of sequences of representations of any of the three families of classical Weyl groups Wn: the symmetric groups, the signed permutation groups (hyperoctahedral groups), or the even-signed permutation groups. Our results extend work of Church, Ellenberg, Farb, and Nagpal on the symmetric groups. We use the concept of an FIW-module, an algebraic object that encodes the data of a sequence of Wn-representations with maps between them, defined in the author's recent work ArXiv:1309.3817. We show that if a sequence Vn of Wn-representations has the structure of a finitely generated FIW-module, then there are substantial constraints on the growth of the sequence and the structure of the characters: for n large, the dimension of Vn is equal to a polynomial in n, and the characters of Vn are given by a character polynomial in signed-cycle-counting class functions, independent of n. We determine bounds the degrees of these polynomials. We continue to develop the theory of FIW-modules, and we apply this theory to obtain new results about a number of sequences associated to the classical Weyl groups: the cohomology of complements of classical Coxeter hyperplane arrangements, and the cohomology of the pure string motion groups (the groups of symmetric automorphisms of the free group).