On the relation of some combinatorial functions to representation theory

Abstract

The paper is devoted to the study of some well-knonw combinatorial functions on the symmetric group --- the major index , the descent number , and the inversion number ∈v --- from the representation-theoretic point of view. We show that each of these functions generates in the group algebra the same ideal, and the restriction of the left regular representation to this ideal is isomorphic to the representation of in the space of n× n skew-symmetric matrices. This allows us to obtain formulas for the functions ,,∈v in terms of matrices of an exceptionally simple form. These formulas are applied to find the spectra of the elements under study in the regular representation, as well as to deduce a series of identities relating these functions to one another and to the number of fixed points . Keywords: major index, descent number, inversion number, representations of the symmetric group, skew-symmetric matrices, dual complexity.