Rational lines on cubic hypersurfaces II
Abstract
We show that any rational cubic hypersurface of dimension at least 33 defined over a number field K vanishes on a K-rational projective line, reducing the previous lower bound of Wooley by two. For K= Q we can reduce the bound to 29. The main ingredients are a result on linear spaces on quadratic forms over suitable non-real quadratic field extensions, and recent work of Bernert and Hochfilzer on cubic forms over imaginary quadratic number fields for the rational case.
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