Sums of polynomial-type exceptional units modulo n

Abstract

Let f(x)∈Z[x] be a nonconstant polynomial. Let n, k and c be integers such that n 1 and k 2. An integer a is called an f-exunit in the ring Zn of residue classes modulo n if (f(a),n)=1. In this paper, we use the principle of cross-classification to derive an explicit formula for the number Nk,f,c(n) of solutions (x1,...,xk) of the congruence x1+...+xk c n with all xi being f-exunits in the ring Zn. This extends a recent result of Anand et al. [On a question of f-exunits in Z/nZ, Arch. Math. (Basel) 116 (2021), 403-409]. We derive a more explicit formula for Nk,f,c(n) when f(x) is linear or quadratic.