Equidistributions of Jacobi sums

Abstract

Let Fq be a finite field of q elements. We show that the normalized Jacobi sum J(,η)/q, for each fixed non-trivial multiplicative character η, becomes equidistributed in the unit circle as q→+∞, when runs over all non-trivial multiplicative characters different from η-1. Previously, the similar equidistribution was obtained by Katz and Zheng by varying both of and η. On the other hand, we also obtain the equidistribution of J(,η) as (,η) runs over X×Y⊂eq(F*)2, as long as |X|>q12+ and |Y|>q for any >0. This updates a recent work of Lu, Zheng and Zheng, who require |X||Y|>q2q. The main ingredient is the estimate for hypergeometric sums due to Katz.