The equivalence of several conjectures on independence of

Abstract

We consider several conjectures on the independence of of the \'etale cohomology of (singular, open) varieties over Fp. The main result is that independence of of the Betti numbers hic(X, Q) for arbitrary varieties is equivalent to independence of of homological equivalence hom, for cycles on smooth projective varieties. We give several other equivalent statements. As a surprising consequence, we prove that independence of of Betti numbers for smooth quasi-projective varieties implies the same result for arbitrary separated finite type k-schemes.