Jörg Jahnel, Daniel Loughran
Published 2014-10-21Version 1
In this paper, we consider the following problem: Does there exist a cubic surface over $\mathbb{Q}$ which contains no line over $\mathbb{Q}$, yet contains a line over every completion of $\mathbb{Q}$? This question may be interpreted as asking whether the Hilbert scheme of lines on a cubic surface can fail the Hasse principle. We also consider analogous problems, over arbitrary number fields, for other del Pezzo surfaces and complete intersections of two quadrics.
On the number of certain Del Pezzo surfaces of degree four violating the Hasse principle
Index of fibrations and Brauer classes that never obstruct the Hasse principle
The discriminant of a cubic surface
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