Some formulae relating modular representations of elementary abelian p-groups

Abstract

Let p>0 be a prime, k a field of characteristic p and G and elementary abelian p-group of order q = pn. Let W be an indecomposable kG-module of dimension 2 and define Vi=Si-1(W*) for each i=1 … q. We show that V2 Vi Vi+1 Vi-1 provided i is not divisible by p, and that V2 Vp is indecomposable if n>1. Our results generalise results of Almkvist and Fossum for representations of cyclic groups of order p. We show how our results give formulae for the direct sum decomposition of Vi Vj for i<p and j<j modulo summands projective to r=0p-1Vrp and conjecture that these formulae extend to the case i<q and j<q. We provide some evidence for our conjecture.

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