Iwasawa cohomology of analytic (L,L)-modules
Abstract
We show that the coadmissibility of the Iwasawa cohomology of an L-analytic Lubin-Tate (L,L)-module M is necessary and sufficient for the existence of a comparison isomorphism between the former and the analytic cohomology of its Lubin-Tate deformation, which, roughly speaking, is given by the base change of M to the algebra of L-analytic distributions. We verify that coadmissibility is satisfied in the trianguline case and show that it can be ``propagated'' to a reasonably large class of modules, provided it can be proven in the \'etale case.
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