Non-algebraic geometrically trivial cohomology classes over finite fields
Abstract
We give the first examples of smooth projective varieties X over a finite field F admitting a non-algebraic torsion -adic cohomology class of degree 4 which vanishes over F. We use them to show that two versions of the integral Tate conjecture over F are not equivalent to one another and that a fundamental exact sequence of Colliot-Th\'el\`ene and Kahn does not necessarily split. Some of our examples have dimension 4, and are the first known examples of fourfolds with non-vanishing H3nr(X,Q2/Z2(2)).
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