Class numbers and invariant characters of sl2(Fp)
Abstract
Let p be a prime and let S2((p)) be the space of weight 2 cusp forms for the principal congruence subgroup (p). Then SL2(Fp) acts on S2((p)) in a natural way. Around 1928, Hecke proved that if p>3 and p 3 4, then the class number of Q(-p) is equal to the difference between the multiplicities of two particular irreducible representations of SL2(Fp) in S2((p)). In this paper we prove a Lie algebra analogue of this result. As an application we extend Hecke's result to SL2(Z/pr) (acting on S2((pr))) for any r≥ 2.
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