Linear system of hypersurfaces passing through a Galois orbit

Abstract

Let d and n be positive integers, and E/F be a separable field extension of degree m=n+dn. We show that if |F| > 2, then there exists a point P∈ Pn(E) which does not lie on any degree d hypersurface defined over F. In other words, the m Galois conjugates of P impose independent conditions on the m-dimensional F-vector space of degree d forms in x0, x1, …, xn. As an application, we determine the maximal dimensions of linear systems L1 and L2 of hypersurfaces in Pn over a finite field F, where every F-member of L1 is reducible and every F-member of L2 is irreducible.

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