Mod p local-global compatibility for GSp4(Qp) in the ordinary case
Abstract
Let F be a totally real field of even degree in which p splits completely. Let r:GF → GSp4(Fp) be a modular Galois representation unramified at all finite places away from p and upper-triangular, maximally nonsplit, and of parallel weight at places dividing p. Fix a place w dividing p. Assuming certain genericity conditions and Taylor--Wiles assumptions, we prove that the GSp4(Fw)-action on the corresponding Hecke-isotypic part of the space of mod p automorphic forms on a compact mod center form of GSp4 with infinite level at w determines r|GFw.
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