Smooth hypersurface sections containing a given subscheme over a finite field

Abstract

We use the "closed point sieve" to prove a variant of a Bertini theorem over finite fields. Specifically, given a smooth quasi-projective subscheme X of Pn of dimension m over Fq, and a closed subscheme Z in Pn such that Z intersect X is smooth of dimension l, we compute the fraction of homogeneous polynomials vanishing on Z that cut out a smooth subvariety of X. The fraction is positive if m>2l.