On the Elementary Symmetric Functions of \1,1/2,…,1/n\\1/i\

Abstract

In 1946, P. Erdos and I. Niven proved that there are only finitely many positive integers n for which one or more of the elementary symmetric functions of 1,1 / 2, ·s, 1 / n are integers. In 2012, Y. Chen and M. Tang proved that if n ≥slant 4, then none of the elementary symmetric functions of 1,1 / 2, ·s, 1 / n are integers. In this paper, we prove that if n ≥slant 5, then none of the elementary symmetric functions of \1,1 / 2, ·s, 1 / n\ \1 / i\ are integers except for n=i=2 and n=i=4.

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