Linear families of smooth hypersurfaces over finitely generated fields
Abstract
Let K be a finitely generated field. We construct an n-dimensional linear system L of hypersurfaces of degree d in Pn defined over K such that each member of L defined over K is smooth, under the hypothesis that the characteristic p does not divide (d, n+1) (in particular, there is no restriction when K has characteristic 0). Moreover, we exhibit a counterexample when p divides (d, n+1).
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