Fermat's Little Theorem and Euler's Theorem in a class of rings

Abstract

Considering Zn the ring of integers modulo n, the classical Fermat-Euler theorem establishes the existence of a specific natural number (n) satisfying the following property: x(n)=1%1.0cmfor all0.2cmx∈ Zn*, for all x belonging to the group of units of Zn. In this manuscript, this result is extended to a class of rings that satisfies some mild conditions.