On the Asymptotic Behavior of a Multiplicative Arithmetic Function Related to the Divisor Function Over Perfect Squares Integers Generated by Shifting

Abstract

Let x be a real number satisfying x ≥ 2. For any positive integer n, we define s(n) as the smallest non-negative integer such that n + s(n) is a perfect square. In this paper, we derive an asymptotic formula for the sum equation* Σn ≤ x D(n + s(n)), equation* where equation* D(n) = τ(n)2ω(n). equation* Here, τ(n) denotes the number of positive divisors of n, and ω(n) stands for the number of distinct prime factors of n.