Bernstein-Zelevinsky duality for locally analytic principal series representations
Abstract
We consider certain dual of the Kohlhaase-Schraen resolutions for locally analytic principal series representations of p-adic Lie groups in the case of integral weights. The dual complexes calculate the expected Bernstein-Zelevinsky dual of the locally analytic representations and lead to the Grothendieck-Serre duality of coherent sheaves on patched eigenvarieties.
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