Arbitrarily large jumps in the de Rham and Hodge cohomology of families in characteristic p
Abstract
We construct smooth projective families of algebraic varieties in characteristic p such that the dimensions of the de Rham and Hodge cohomology groups of the fibers can be made to jump by an arbitrarily large amount. To do this, we first construct an example using the classifying stack of a finite flat group scheme which degenerates Z/p2Z to αp αp. Along the way, we give a self-contained exposition of the construction of Godeaux--Serre varieties.
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