On the multiplicative order of an modulo n

Abstract

Let n be a positive integer and αn be the arithmetic function which assigns the multiplicative order of an modulo n to every integer a coprime to n and vanishes elsewhere. Similarly, let βn assign the projective multiplicative order of an modulo n to every integer a coprime to n and vanishes elsewhere. In this paper, we present a study of these two arithmetic functions. In particular, we prove that for positive integers n1 and n2 with the same square-free part, there exists an exact relationship between the functions αn1 and αn2 and between the functions βn1 and βn2. This allows us to reduce the determination of αn and βn to the case where n is square-free. These arithmetic functions recently appeared in the context of an old problem of Molluzzo, and more precisely in the study of which arithmetic progressions yield a balanced Steinhaus triangle in Z/nZ for n odd.