On the value set of small families of polynomials over a finite field, II

Abstract

We obtain an estimate on the average cardinality of the value set of any family of monic polynomials of Fq[T] of degree d for which s consecutive coefficients ad-1,...,ad-s are fixed. Our estimate asserts that V(d,s,a)=μd\,q+O(q1/2), where V(d,s,a) is such an average cardinality, μd:=Σr=1d(-1)r-1/r! and a:=(ad-1,...,ad-s). We also prove that V2(d,s,a)=μd2\,q2+O(q3/2), where that V2(d,s,a) is the average second moment on any family of monic polynomials of Fq[T] of degree d with s consecutive coefficients fixed as above. Finally, we show that V2(d,0)=μd2\,q2+O(q), where V2(d,0) denotes the average second moment of all monic polynomials in Fq[T] of degree d with f(0)=0. All our estimates hold for fields of characteristic p>2 and provide explicit upper bounds for the constants underlying the O--notation in terms of d and s with "good" behavior. Our approach reduces the questions to estimate the number of Fq--rational points with pairwise--distinct coordinates of a certain family of complete intersections defined over Fq. A critical point for our results is an analysis of the singular locus of the varieties under consideration, which allows to obtain rather precise estimates on the corresponding number of Fq--rational points.