English

The arithmetic derivative and Leibniz-additive functions

Number Theory 2018-03-20 v1

Abstract

An arithmetic function ff is Leibniz-additive if there is a completely multiplicative function hfh_f, i.e., hf(1)=1h_f(1)=1 and hf(mn)=hf(m)hf(n)h_f(mn)=h_f(m)h_f(n) for all positive integers mm and nn, satisfying f(mn)=f(m)hf(n)+f(n)hf(m) f(mn)=f(m)h_f(n)+f(n)h_f(m) for all positive integers mm and nn. A motivation for the present study is the fact that Leibniz-additive functions are generalizations of the arithmetic derivative DD; namely, DD is Leibniz-additive with hD(n)=nh_D(n)=n. In this paper, we study the basic properties of Leibniz-additive functions and, among other things, show that a Leibniz-additive function ff is totally determined by the values of ff and hfh_f at primes. We also consider properties of Leibniz-additive functions with respect to the usual product, composition and Dirichlet convolution of arithmetic functions.

Keywords

Cite

@article{arxiv.1803.06849,
  title  = {The arithmetic derivative and Leibniz-additive functions},
  author = {Pentti Haukkanen and Jorma K. Merikoski and Timo Tossavainen},
  journal= {arXiv preprint arXiv:1803.06849},
  year   = {2018}
}
R2 v1 2026-06-23T00:57:17.852Z