Polynomial relations between operators on chains of representation rings

Abstract

Given a chain of groups G0 G1 G2 ... , we may form the corresponding chain of their representation rings, together with induction and restriction operators. We may let Resl denote the operator which restricts down l steps, and similarly for Indl. Observe then that Indl Resl is an operator from any particular representation ring to itself. The central question that this paper addresses is: "What happens if the Indl Resl operator is a polynomial in the Ind Res operator?". We show that chains of wreath products \Hn Sn\n ∈ N have this property, and in particular, the polynomials that appear in the case of symmetric groups are the falling factorial polynomials. An application of this fact gives a remarkable new way to compute characters of wreath products (in particular symmetric groups) using matrix multiplication. We then consider arbitrary chains of groups, and find very rigid constraints that such a chain must satisfy in order for Indl Resl to be a polynomial in Ind Res. Our rigid constraints justify the intuition that this property is indeed a very rare and special property.