Numerically trivial automorphisms of Enriques surfaces in characteristic 2

Abstract

An automorphism of an algebraic surface S is called cohomologically (numerically) trivial if it acts identically on the second l-adic cohomology group (this group modulo torsion subgroup). Extending the results of S. Mukai and Y. Namikawa to arbitrary characteristic p > 0, we prove that the group of cohomologically trivial automorphisms Autct(S) of an Enriques surface S is of order ≤ 2 if S is not supersingular. If p = 2 and S is supersingular, we show that Autct(S) is a cyclic group of odd order n∈ \1,2,3,5,7,11\ or the quaternion group Q8 of order 8 and we describe explicitly all the exceptional cases. If KS ≠ 0, we also prove that the group Autnt(S) of numerically trivial automorphisms is a subgroup of a cyclic group of order ≤ 4 unless p = 2, where Autnt(S) is a subgroup of a 2-elementary group of rank ≤ 2.