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Estimates for $k$-dimensional spherical summations of arithmetic functions of the GCD and LCM

Randell Heyman, László Tóth

Abstract

Let $k\ge 2$ be a fixed integer. We consider sums of type $\sum_{n_1^2+\cdots+ n_k^2\le x} F(n_1,\ldots,n_k)$, taken over the $k$-dimensional spherical region $\{(n_1,\ldots,n_k)\in {\Bbb Z}^k: n_1^2+\cdots+ n_k^2\le x\}$, where $F:{\Bbb Z}^k\to {\Bbb C}$ is a given function. In particular, we deduce asymptotic formulas with remainder terms for the spherical summations $\sum_{n_1^2+\cdots+ n_k^2\le x} f((n_1,\ldots,n_k))$ and $\sum_{n_1^2+\cdots+ n_k^2\le x} f([n_1,\ldots,n_k])$, involving the GCD and LCM of the integers $n_1,\ldots,n_k$, where $f:{\Bbb N}\to {\Bbb C}$ belongs to certain classes of functions.

Estimates for $k$-dimensional spherical summations of arithmetic functions of the GCD and LCM

Abstract

Let be a fixed integer. We consider sums of type , taken over the -dimensional spherical region , where is a given function. In particular, we deduce asymptotic formulas with remainder terms for the spherical summations and , involving the GCD and LCM of the integers , where belongs to certain classes of functions.
Paper Structure (14 sections, 16 theorems, 141 equations)

This paper contains 14 sections, 16 theorems, 141 equations.

Key Result

Lemma 2.1

Let $f:{\mathds{N}} \cup \{0\}\to {\mathds{C}}$ be an arbitrary function with $f(0)=0$. Then for every $n\in {\mathds{N}}$,

Theorems & Definitions (28)

  • Lemma 2.1
  • Lemma 2.2
  • Lemma 2.3
  • Lemma 2.4
  • Lemma 2.5
  • Theorem 3.1
  • Theorem 3.2
  • Corollary 3.3
  • Theorem 3.4
  • Corollary 3.5
  • ...and 18 more