On a certain class of arithmetic functions

On a certain class of arithmetic functions

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A homothetic arithmetic function of ratio $K$ is a function $f mathbb{N} ightarrow caramilk latte R$ such that $f(Kn)=f(n)$ for every $ninmathbb{N}$.Periodic arithmetic funtions are always homothetic, while the converse is not true in general.In this paper we study homothetic and periodic arithmetic functions.

In particular we give an upper bound for the number of elements of $f(mathbb{N})$ in terms 75 corvette door panels of the period and the ratio of $f$.