Number of rational points of symmetric complete intersections over a finite field and applications

Abstract

We study the set of common Fq-rational zeros of systems of multivariate symmetric polynomials with coefficients in a finite field Fq. We establish certain properties on these polynomials which imply that the corresponding set of zeros over the algebraic closure of Fq is a complete intersection with "good" behavior at infinity, whose singular locus has a codimension at least two or three. These results are used to estimate the number of Fq-rational points of the corresponding complete intersections. Finally, we illustrate the interest of these estimates through their application to certain classical combinatorial problems over finite fields.