Variance of sums in arithmetic progressions of divisor functions associated with higher degree l-functions in Fq(t)

Abstract

We compute the variances of sums in arithmetic progressions of generalised k-divisor functions related to certain L-functions in Fq(t), in the limit as q∞. This is achieved by making use of recently established equidistribution results for the associated Frobenius conjugacy classes. The variances are thus expressed, when q∞, in terms of matrix integrals, which may be evaluated. Our results extend those obtained previously in the special case corresponding to the usual k-divisor function, when the L-function in question has degree one. They illustrate the role played by the degree of the L-functions; in particular, we find qualitatively new behaviour when the degree exceeds one. Our calculations apply, for example, to elliptic curves defined over Fq(t), and we illustrate them by examining in some detail the generalised k-divisor functions associated with the Legendre curve.