Rationality proofs by curve counting

Abstract

We propose an approach for showing rationality of an algebraic variety X. We try to cover X by rational curves of certain type and count how many curves pass through a generic point. If the answer is 1, then we can sometimes reduce the question of rationality of X to the question of rationality of a closed subvariety of X. This approach is applied to the case of the so-called Ueno-Campana manifolds. Our experiments indicate that the previously open cases X4,6 and X5,6 are both rational. However, this result is not rigorously justified and depends on a heuristic argument and a Monte Carlo type computer simulation. In an unexpected twist, existence of lattices D6, E8 and 10 turns out to be crucial.