Nilpotence, radicaux et structures mono\"dales
Abstract
For K a field, a Wedderburn K-linear category is a K-linear category whose radical is locally nilpotent and such that :=/ is semi-simple and remains so after any extension of scalars. We prove existence and uniqueness results for sections of the projection , in the vein of the theorems of Wedderburn. There are two such results: one in the general case and one when has a monoidal structure for which is a monoidal ideal. The latter applies notably to Tannakian categories over a field of characteristic zero, and we get a generalisation of the Jacobson-Morozov theorem: the existence of a pro-reductive envelope (G) associated to any affine group scheme G over K. Other applications are given in this paper as well as in a forthcoming one on motives.
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