Splitting and making explicit the de Rham complex of the Drinfeld space
Abstract
Let p be a prime number, K a finite extension of Qp and n an integer ≥ 2. We completely and explicitly describe the global sections of the de Rham complex of the Drinfeld space over K in dimension n-1 as a complex of (duals of) locally K-analytic representations of GLn(K). Using this description, we construct an explicit section in the derived category of (duals of) finite length admissible locally K-analytic representations of GLn(K) to the canonical morphism of complexes Hn-1()[-(n-1)].
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