Relatively Prime Sets, Divisor Sums, and Partial Sums

Abstract

For a nonempty finite set A of positive integers, let (A) denote the greatest common divisor of the elements of A. Let f(n) and (n) denote, respectively, the number of subsets A of \1, 2, …, n\ such that (A) = 1 and the number of subsets A of \1, 2, …, n\ such that (A\n\) =1. Let D(n) be the divisor sum of f(n). In this article, we obtain partial sums of f(n), (n) and D(n). We also obtain a combinatorial interpretation and a congruence property of D(n). We give open questions concerning (n) and D(n) at the end of this article.