Families of Paraboline (,K)-modules
Abstract
Let p be a prime and K be a p-adic local field. We study the stack of quasi-deRham (,K)-modules, i.e. (,K)-modules that are deRham up to twist by characters. These objects are used to construct and then study the so called the paraboline varieties, which parametrize successive extensions of quasi-deRham (,K)-modules of a certain type, generalizing the trianguline varieties. On the automorphic side, We construct relative eigenvarieties, and prove the existence of some local-global compatible morphism between them via showing the density of "classical points".
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