A supercharacter table decomposition via power-sum symmetric functions

Abstract

We give an AB-factorization of the supercharacter table of the group of n× n unipotent upper triangular matrices over q, where A is a lower-triangular matrix with entries in [q] and B is a unipotent upper-triangular matrix with entries in [q-1]. To this end we introduce a q deformation of a new power-sum basis of the Hopf algebra of symmetric functions in noncommutative variables. The factorization is obtain from the transition matrices between the supercharacter basis, the q-power-sum basis and the superclass basis. This is similar to the decomposition of the character table of the symmetric group Sn given by the transition matrices between Schur functions, monomials and power-sums. We deduce some combinatorial results associated to this decomposition. In particular we compute the determinant of the supercharacter table.