Local rigid cohomology of singular points
Abstract
We show that if two singular points x' ∈ X' and x ∈ X on schemes over a field k of characteristic p > 0 are contact equivalent then the rigid cohomology spaces Hrig, \x\(X) and Hrig, \x'\(X') are isomorphic. The isomorphism that we construct is moreover compatible with the Frobenius structure on rigid cohomology.
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