Tate cohomology and local base change of generic representations of GL3 -- non-banal case
Abstract
Let F be a finite extension of Qp, and let E be a finite Galois extension of F with degree of extension l, where l and p are distinct odd primes. Let πF be an integral, l-adic generic representation of GL3(F), and let πE be the base change lifting of πF to GL3(E). Let Jl(πF) (resp. Jl(πE)) be the unique generic sub-quotient of the mod-l reduction of πF (resp. πE). In this article, using the local converse theorem over local Artinian Fl-algebras, we prove that the Frobenius twist of Jl(πF) is isomorphic to the Tate cohomology group H0( Gal(E/F),Jl(πE)). The result of this article removes the hypothesis that the prime l does not divide the pro-order of GL2(F).
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