Degrees of closed points on hypersurfaces
Abstract
Let k be any field. Let X ⊂ PkN be a degree d ≥ 2 hypersurface. Under some conditions, we prove that if X(K) ≠ for some extension K/k with n:=[K:k] ≥ 2 and (n,d)=1, then X(L) ≠ for some extension L/k with ([L:k], d)=1, n [L:k], and [L:k] ≤ nd-n-d. Moreover, if a K-solution is known explicitly, then we can compute L/k explicitly as well. As an application, we improve upon a result by Coray on smooth cubic surfaces X ⊂ P3k by showing that if X(K) ≠ for some extension K/k with ([K:k], 3)=1, then X(L) ≠ for some L/k with [L:k] ∈ \1, 10\.
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