Bloch's conjecture for surfaces with involutions and of geometric genus zero

Abstract

Let S be a smooth projective surface with pg=0, let be a regular involution acting on S, and let W be the resolution of singularities of the quotient surface S/ . In the paper we prove that Bloch's conjecture holds for the surface S if and only if it holds for the surface W. This yields Bloch's conjecture for all surfaces S whenever the same conjecture is true for the desingularized quotient W. In particular, Bloch's conjecture holds true for all numerical Godeaux surfaces with involutions, a "half" of Campedelli surfaces with involutions, the surface of Craighero and Gattazzo, some Catanese surfaces and other examples. Applying the same method to K3-surfaces, we prove that if a K3-surface S admits a regular involution whose quotient is of Enriques type, then the motive M(S) is finite-dimensional.