A census of zeta functions of quartic K3 surfaces over F2

Abstract

We compute the complete set of candidates for the zeta function of a K3 surface over F2 consistent with the Weil conjectures, as well as the complete set of zeta functions of smooth quartic surfaces over F2. These sets differ substantially, but we do identify natural subsets which coincide. This gives some numerical evidence towards a Honda-Tate theorem for transcendental zeta functions of K3 surfaces; such a result would refine a recent theorem of Taelman, in which one must allow an uncontrolled base field extension.