Invariants de Hasse-Witt des r\'eductions de certaines vari\'et\'es symplectiques irr\'eductibles
Abstract
Let X be an irreducible symplectic variety defined over a number field K. Assume either that X has Picard number at least two or that X has even second Betti number. We prove that there exist a finite algebraic field extension L/K and a density 1 set S of non-archimedean places of L such that the reduction of X at any place in S has nonzero Hasse-Witt invariant.
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