On the distribution of Jacobi sums

Abstract

Let Fq be a finite field of q elements. For multiplicative characters 1,…, m of Fq×, we let J(1,…, m) denote the Jacobi sum. Nicholas Katz and Zhiyong Zheng showed that for m=2, the normalized Jacobi sum q-1/2J(1,2) (12 nontrivial) is asymptotically equidistributed on the unit circle as q ∞, when 1 and 2 run through all nontrivial multiplicative characters of Fq×. In this paper, we show a similar property for m 2. More generally, we show that the normalized Jacobi sum q-(m-1)/2J(1,…,m) (1…m m nontrivial) is asymptotically equidistributed on the unit circle, when 1,…, m run through arbitrary sets of nontrivial multiplicative characters of Fq× with two of the sets being sufficiently large. The case m=2 answers a question of Shparlinski.