Abstract
We prove some density results for integral points on affine open sets of Fano threefolds. For instance, let X^o=mathbb P^3{setminus } D where D is the union of two quadrics such that their intersection contains a smooth conic, or the union of a smooth quadric surface and two planes, or the union of a smooth cubic surface V and a plane Pi such that the intersection Vcap Pi contains a line. In all these cases we show that the set of integral points of X^o is potentially dense. We apply the above results to prove that integral points are potentially dense in some log-Fano or in some log-Calabi-Yau threefold.
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