On freeness of compactly induced mod-p representations of SL2(F)
Abstract
Let p be a prime, and F a non-archimedean local field with residue characteristic p and ring of integers OF. Set GS:= SL2(F)and K0:= SL2(OF) . For a smooth irreducible Fp-representation σ of K0, we study the structure of the compact induction indK0GS(σ) as a left module over the standard spherical Hecke algebra EndGS( indK0GS(σ)). We prove that it is free and of infinite rank.
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