Derived Satake morphisms for p-small weights in characteristic p
Abstract
Let F be a finite unramified extension of Qp with ring of integers OF, and let G denote a split, connected reductive group over OF. We fix a Borel subgroup B = TU with maximal torus T and unipotent radical U, and let L(λ) denote an irreducible representation of G0 := G(OF) with coefficients in a sufficiently large field of characteristic p. Set G := G(F), etc. Assuming λ is a p-small and sufficiently regular character and that p - 1 is greater than the Coxeter number of G, we show that the complex L(U,c-indG0G(L(λ))) splits as the orthogonal direct sum of its cohomology objects in the derived category of smooth T-representations in characteristic p. (Here L(U, -) denotes Heyer's left adjoint of parabolic induction, from the derived category of smooth G-representations to the derived category of smooth T-representations.) Consequently, this gives rise to a collection of morphisms of graded spherical Hecke algebras i ∈ ZExtGi(c-indG0G(L(λ)),~c-indG0G(L(λ))) i ∈ ZExtTi(c-indT0T(Ln(U0,L(λ))),~c-indT0T(Ln(U0,L(λ)))) indexed by n=-[F:Qp](U), …, 0, which we refer to as derived Satake morphisms. For λ=0 and n=0, this recovers the graded mod p Satake homomorphism constructed by Ronchetti. We also give some partial results for general standard parabolic subgroups P = MN ⊂ G.
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