Two coniveau filtrations and algebraic equivalence over finite fields

Abstract

We extend the basic theory of the coniveau and strong coniveau filtrations to the -adic setting. By adapting the examples of Benoist--Ottem to the -adic context, we show that the two filtrations differ over any algebraically closed field of characteristic not 2. When the base field F is finite, we show that the equality of the two filtrations over the algebraic closure F has some consequences for algebraic equivalence for codimension-2 cycles over F. As an application, we prove that the third unramified cohomology group H3nr(X,Q/Z) vanishes for a large class of rationally chain connected threefolds X over F, confirming a conjecture of Colliot-Th\'el\`ene and Kahn.