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

Abstract

Let Fq be the finite field of q=pm 1 4 elements with p being an odd prime and m being a positive integer. For c, y ∈Fq with y∈Fq* non-quartic, let Nn(c) and Mn(y) be the numbers of zeros of x14+...+xn4=c and x14+...+xn-14+yxn4=0, respectively. In 1979, Myerson used Gauss sum and exponential sum to show that the generating function Σn=1∞Nn(0)xn is a rational function in x and presented its explicit expression. In this paper, we make use of the cyclotomic theory and exponential sums to show that the generating functions Σn=1∞Nn(c)xn and Σn=1∞Mn+1(y)xn are rational functions in x. We also obtain the explicit expressions of these generating functions. Our result extends Myerson's theorem gotten in 1979.