On the number of zeros of diagonal cubic forms over finite fields

Abstract

Let Fq be the finite field with q=pk elements with p being a prime and k be a positive integer. For any y, z∈Fq, let Ns(z) and Ts(y) denote the numbers of zeros of x13+·s+xs3=z and x13+·s+xs-13+yxs3=0, respectively. Gauss proved that if q=p, p13 and y is non-cubic, then T3(y)=p2+12(p-1)(-c+9d), where c and d are uniquely determined by 4p=c2+27d2,~c 1 3 except for the sign of d. In 1978, Chowla, Cowles and Cowles determined the sign of d for the case of 2 being a non-cubic element of Fp. But the sign problem is kept open for the remaining case of 2 being cubic in Fp. In this paper, we solve this sign problem by determining the sign of d when 2 is cubic in Fp. Furthermore, we show that the generating functions Σs=1∞ Ns(z) xs and Σs=1∞ Ts(y)xs are rational functions for any z, y∈ Fq*:= Fq \0\ with y being non-cubic over Fq and also give their explicit expressions. This extends the theorem of Myerson and that of Chowla, Cowles and Cowles.