Fredman's reciprocity, invariants of abelian groups, and the permanent of the Cayley table

Abstract

Let R be the regular representation of a finite abelian group G and let Cn denote the cyclic group of order n. For G=Cn, we compute the Poincare series of all Cn-isotypic components in S· R · R (the symmetric tensor exterior algebra of R). From this we derive a general reciprocity and some number-theoretic identities. This generalises results of Fredman and Elashvili-Jibladze. Then we consider the Cayley table, MG, of G and some generalisations of it. In particular, we prove that the number of formally different terms in the permanent of MG equals (Sn R)G, where n is the order of G.