Th\'eorie de Sen et vecteurs localement analytiques
Abstract
We generalize Sen theory to extensions K∞/K whose Galois group is a p-adic Lie group of arbitrary dimension. To do so, we replace Sen's space of K-finite vectors by Schneider and Teitelbaum's space of locally analytic vectors. One then gets a vector space over the field of locally analytic vectors of K∞. We describe this field in general and pay a special attention to the case of Lubin-Tate extensions.
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