The elementary symmetric functions of reciprocals of the elements of arithmetic progressions

Abstract

Let a and b be positive integers. In 1946, Erdos and Niven proved that there are only finitely many positive integers n for which one or more of the elementary symmetric functions of 1/b, 1/(a+b),..., 1/(an-a+b) are integers. In this paper, we show that for any integer k with 1 k n, the k-th elementary symmetric function of 1/b, 1/(a+b),..., 1/(an-a+b) is not an integer except that either b=n=k=1 and a 1, or a=b=1, n=3 and k=2. This refines the Erdos-Niven theorem and answers an open problem raised by Chen and Tang in 2012.