On the cohomologically trivial automorphisms of elliptic surfaces I: (S)=0

Abstract

In this first part we describe the group AutZ(S) of cohomologically trivial automorphisms of a properly elliptic surface (a minimal surface S with Kodaira dimension (S)=1), in the initial case (OS) =0. In particular, in the case where AutZ(S) is finite, we give the upper bound 4 for its cardinality, showing more precisely that if AutZ(S) is nontrivial, it is one of the following groups: Z/2, Z/3, (Z/2)2. We also show with easy examples that the groups Z/2, Z/3 do effectively occur. Respectively, in the case where AutZ(S) is infinite, we give the sharp upper bound 2 for the number of its connected components.