Infinite divisibility of Smith matrices

TL;DR

This paper investigates conditions under which certain matrices derived from arithmetical functions are infinitely divisible, extending previous results and providing new classes of such matrices through multiplicative functions and Dirichlet convolutions.

Contribution

It establishes new criteria for infinite divisibility of matrices constructed from arithmetical functions, including extensions to Dirichlet convolutions, broadening the class of known infinitely divisible matrices.

Findings

Matrices from multiplicative functions are infinitely divisible under certain conditions.

Extension of results to matrices involving Dirichlet convolutions.

Provides numerous new examples of infinitely divisible matrices.

Abstract

Given an arithmetical function $f$, by $f(a, b)$ and $f[a, b]$ we denote the function $f$ evaluated at the greatest common divisor $(a, b)$ of positive integers $a$ and $b$ and evaluated at the least common multiple $[a, b]$ respectively. A positive semi-definite matrix $A=(a_{ij})$ with $a_{ij}\ge 0$ for all $i$ and $j$ is called infinitely divisible if the fractional Hadamard power $A^{\circ r}=(a_{ij}^r)$ is positive semi-definite for every nonnegative real number $r$. Let $S=\{x_1, ..., x_n\}$ be a set of $n$ distinct positive integers. In this paper, we show that if $f$ is a multiplicative function such that $(f*\mu)(d)\ge 0$ whenever $d|x$ for any $x\in S$, then the $n\times n$ matrices $(f(x_i, x_j))$, $(\frac{1}{f[x_i, x_j]})$ and $(\frac{f(x_i, x_j)}{f[x_i, x_j]})$ are infinitely divisible. Finally we extend these results to the Dirichlet convolution case which produces infinitely many examples of infinitely divisible matrices. Our results extend the results obtained previously by Bourque, Ligh, Bhatia, Hong, Lee, Lindqvist and Seip.