Cohomology of bimultiplicative local systems on unipotent groups

Abstract

Let U1, U2 be connected commutative unipotent algebraic groups defined over an algebraically closed field k of characteristic p>0 and let L be a bimultiplicative Q-local system on U1× U2. In this paper we will study the Q-cohomology H*c(U1× U2,L), which turns out to be supported in only one degree. We will construct a finite Heisenberg group which naturally acts on H*c(U1× U2,L) as an irreducible representation. We will give two explicit realizations of this cohomology and describe the relationship between these two realizations as a finite Fourier transform.