Three Theorems of Sierpinski and Their Unitary Analogues

Abstract

In 1963, Sierpinski proved that (a) a(n) is a power of 2 if and only if n is a product of distinct Mersenne primes {b) cp(n) is a power of 2 if and only if n is a product of distinct Fermat primes (c) a(n) is a power of 3 only when n = l or 2. In this paper we show that similar theorems are valid for their unitary analogues a*(n) and(n).cp'(n).