The set of k-units modulo n

Abstract

Let R be a ring with identity, U(R) the group of units of R and k a positive integer. We say that a∈ U(R) is k-unit if ak=1. Particularly, if the ring R is Zn, for a positive integer n, we will say that a is a k-unit modulo n. We denote with Uk(n) the set of k-units modulo n. By duk(n) we represent the number of k-units modulo n and with rduk(n)=φ(n)duk(n) the ratio of k-units modulo n, where φ is the Euler phi function. Recently, S. K. Chebolu proved that the solutions of the equation rdu2(n)=1 are the divisors of 24. The main result of this work, is that for a given k, we find the positive integers n such that rduk(n)=1. Finally, we give some connections of this equation with Carmichael's numbers and two of its generalizations: Kn\"odel numbers and generalized Carmichael numbers.