Equivariant crystalline cohomology and base change
Abstract
Given a perfect field k of characteristic p>0, a smooth proper k-scheme Y, a crystal E on Y relative to W(k) and a finite group G acting on Y and E, we show that, viewed as virtual k[G]-module, the reduction modulo p of the crystalline cohomology of E is the de Rham cohomology of E modulo p. On the way we prove a base change theorem for the virtual G-representions associated with G-equivariant objects in the derived category of W(k)-modules.
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