Effective Bertini theorems and zeros of p-adic forms of degrees 7 and 11

Abstract

We establish an effective Bertini-type theorem for hypersurfaces Xf f = 0 defined over a finite field k for which f has no linear factors over the algebraic closure k. Given a line L defined over k and a nonreduced k-point x on Xf L, we give an upper bound on the number of planes P containing L for which Xf P contains a line through x. Underlying this result is a factorization algorithm for bivariate polynomials originally due to Kaltofen, which we present with slightly relaxed hypotheses. Our primary application is to Artin's conjecture on p-adic forms of prime degree d: if K/Qp is a finite extension with residue field isomorphic to Fq and F ∈ K[x0, …, xd2] is homogeneous of degree d, the conjecture states F has a nontrivial zero in K. We show this conjecture holds whenever q > 679 for d=7 and q > 7393 for d=11, improving upon a result of Wooley.