Nonvanishing of L--functions associated to fixed order characters over function fields

Abstract

We show that a positive proportion of the values L(1/2,c) are non-zero, where c is the th residue symbol for ≥ 3 over Fq[t], when averaging over square-free polynomials c in Fq[t], as q 1(mod\,2) is fixed and the degree of c goes to infinity. In the case of =3, we show that at least 1/6 of L(1/2,c)≠ 0, while for >3, the proportion depends on the order of the character. This improves a previous result of Ellenberg, Li, and Shusterman showing that there are infinitely many of (prime) order such that L(1/2, ) ≠ 0 (with completely different techniques). Our result is achieved by computing the one-level density of zeros in the family of L--functions and surpassing the (-1,1) barrier for the support of the Fourier transform of the test function, necessary to obtain a positive proportion of non-vanishing result. Using similar techniques, we also prove a result towards the equidistribution of the angles of the order shifted Gauss sums when summing over prime arguments, a result which may be of independent interest.