Extensions of mod p representations of division algebras over non-Archimedean local fields
Abstract
Let F be a local field over Qp or Fp((t)), and let D be a central simple division algebra over F of degree d. In the p-adic case, we assume p>de+1 where e is the ramification degree over Qp; otherwise, we need only assume p and d are coprime. For the subgroup I1=1+D OD of D× we determine the structure of H1(I1, π) as a representation of D×/I1 for an arbitrary smooth irreducible representation π of D×. We use this to compute the group Ext1D×(π,π') for arbitrary smooth irreducible representations π and π' of D×. In the p-adic case, via Poincar\'e duality we can compute the top cohomology groups and compute the highest degree extensions.
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