Solutions of full equations related to diagonal equations

Abstract

Let p be a prime number, m be an even positive integer, and Fq be a finite field with q = pm elements. In this paper, we compute the number of solutions with all coordinates in Fq* for diagonal equations of the form a1 x1d + … + as xsd = b, ai ∈ Fq*, \, b ∈ Fq, when the coefficients and exponents satisfy specific arithmetic conditions that facilitate the computation through pure Gauss sums. We then apply this result to determine the number of solutions for equations of the form a1 x1d1,1 ·s xndn,1 + … + as x1d1,s·s xndn,s = b, where all exponents are positive, and the equation is related in a particular way to diagonal equations with the aforementioned characteristics.