Randomly piercing algebraic sets

Abstract

We show, for example, that if one samples \[ p2(1+(p-1)-1) · n2(1 + on ∞(1))\] points in Fpn at random then asymptotically almost surely this set intersects every quadratic hypersurface. We furthermore show that this is tight in that sampling on∞(n2) fewer points almost surely fails to intersect some quadratic hypersurface. Our main result is a sharp threshold for the following problem: how many points in Fpn does one need to randomly sample to almost surely intersect every algebraic set defined by at most s polynomials each of degree at most k? As an application we improve lower bounds in the random Szemerédi theorem in Fpn, in particular obtaining a leading constant which grows as the threshold for what is considered a `dense' set in Szemerédi's theorem shrinks.