On the sums of squares of exceptional units in residue class rings

Abstract

Let n 1, e 1, k 2 and c be integers. An integer u is called a unit in the ring Zn of residue classes modulo n if (u, n)=1. A unit u is called an exceptional unit in the ring Zn if (1-u,n)=1. We denote by Nk,c,e(n) the number of solutions (x1,...,xk) of the congruence x1e+...+xke c n with all xi being exceptional units in the ring Zn. In 2017, Mollahajiaghaei presented a formula for the number of solutions (x1,...,xk) of the congruence x12+...+xk2 c n with all xi being the units in the ring Zn. Meanwhile, Yang and Zhao gave an exact formula for Nk,c,1(n). In this paper, by using Hensel's lemma, exponential sums and quadratic Gauss sums, we derive an explicit formula for the number Nk,c,2(n). Our result extends Mollahajiaghaei's theorem and that of Yang and Zhao.