Finiteness of analytic cohomology of Lubin-Tate (L,L)-modules
Abstract
We prove finiteness and base change properties for analytic cohomology of families of L-analytic (L,L)-modules parametrised by affinoid algebras in the sense of Tate. For technical reasons we work over a field K containing a period of the Lubin-Tate group, which allows us to describe analytic cohomology in terms of an explicit generalized Herr complex.
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