Extending linear and quadratic functions from high rank varieties

Abstract

Let k be a field, V be a k-vector space and X⊂ V an algebraic irreducible subvariety. We say that a function f:X(k) k is weakly linear if its restriction to any two-dimensional linear subspace W of V contained in X is linear and that it is weakly quadratic if its restriction to any three-dimensional linear subspace W of V contained in X is quadratic. We say that X is admissible if any weakly linear function on X is a restriction of a linear function on V and any weakly quadratic function on X is a restriction of a quadratic function on V. The main result in the paper concerns the case when the field k is a finite. We show that for any d,L≥ 1 there exists r=r(d,L,k)∈ Z + such that any complete intersection X∈ V in a vector space V of codimension L, degree d and rank ≥ r is admissible. Moreover we show the existence of a function r(d,L) such that one can take r(d,L,k)=r(d,L) for all finite fields k of characteristic >d. The proof of the admissibility for finite fields k is based on bounds on the number of k-points on ancillary varieties E(X). These results allow us to bound the dimension of varieties E(X). Using these results we were able to prove the admissibility of complex homogeneous varieties of high rank. Using the results of br one can extend our proofs to show the admissibility of varieties of high rank over local non-archimedian fields. Also using Corollary 4.3 of cmpv one can dispense with the assumption that X is a complete intersection.