p-adic Cherednik algebras on rigid analytic spaces
Abstract
Let X be a smooth rigid space with an action of a finite group G satisfying that X/G is represented by a rigid space. We construct sheaves of p-adic Cherednik algebras on the small \'etale site of the quotient X/G, and study some of their properties. The sheaves of p-adic Cherednik algebras are sheaves of Fr\'echet-Stein K-algebras on X/G, which can be regarded as p-adic analytic versions of the sheaves of Cherednik algebras associated to the action of a finite group on a smooth algebraic variety defined by P. Etingof.
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