Reductions of GL2( Qpf)-Banach spaces of slopes in (0,1)
Abstract
Let p be an odd prime and f ≥ 1. We consider a p-adic locally algebraic GL2( Qpf)-representation attached to a tuple of f weights k=(ki) for 0 ≤ i ≤ f-1 and a p-adic integer ap with valuation in (0,1). We give conditions under which the irreducible quotients of the subquotients in a filtration on the reduction mod p of the natural integral structure on this space are supercuspidal. We also check that for small k and f the integral structure is a lattice so that the mod p reduction is nonzero.
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