Quartic and Quintic hypersurfaces with dense rational points

Abstract

Let X4⊂Pn+1 be a quartic hypersurface of dimension n≥ 4 over an infinite field k. We show that if either X4 contains a linear subspace of dimension h≥ \2,( Sing(X4))-2\ or has double points along a linear subspace of dimension h≥ 3, a smooth k-rational point and is otherwise general, then X4 is unirational over k. This improves previous results by A. Predonzan and J. Harris, B. Mazur, R. Pandharipande for quartics. We also provide a density result for the k-rational points of quartic 3-folds with a double plane over a number field, and several unirationality results for quintic hypersurfaces over a Cr field.

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