Geometry and arithmetic of certain log K3 surfaces

Abstract

Let k be a field of characteristic 0. In this paper we describe a classification of smooth log K3 surfaces X over k whose geometric Picard group is trivial and which can be compactified into del Pezzo surfaces. We show that such an X can always be compactified into a del Pezzo surface of degree 5, with a compactifying divisor D being a cycle of five (-1)-curves, and that X is completely determined by the action of the absolute Galois group of k on the dual graph of D. When k=Q and the Galois action is trivial, we prove that for any integral model X/Z of X, the set of integral points X(Z) is not Zariski dense. We also show that the Brauer-Manin obstruction is not the only obstruction for the integral Hasse principle on such log K3 surfaces, even when their compactification is "split".