Averages of completely multiplicative functions over the Gaussian integers -- a dynamical approach

TL;DR

This paper establishes convergence results for averages of multiplicative functions over Gaussian integers using a dynamical systems approach, with applications in number theory and ergodic theory.

Contribution

It introduces a dynamical framework to prove pointwise convergence of multiplicative function averages over Gaussian integers, extending classical results to a new setting.

Findings

Proves a Gaussian integer analogue of Wirsing's theorem.

Establishes existence of limits for averages of multiplicative functions over sums of squares.

Provides a dynamical systems proof of convergence for ergodic averages involving the $oxed{ ext{Omega}}$ function.

Abstract

We prove a pointwise convergence result for additive ergodic averages associated with certain multiplicative actions of the Gaussian integers. We derive several applications in dynamics and number theory, including: (i) Wirsing's theorem for Gaussian integers: if $f\colon \mathbb{G} \to \mathbb{R}$ is a bounded completely multiplicative function, then the following limit exists: $$\lim_{N \to \infty} \frac{1}{N^2} \sum_{1 \leq m, n \leq N} f(m + {\rm i} n).$$ (ii) An answer to a special case of a question of Frantzikinakis and Host: for any completely multiplicative real-valued function $f: \mathbb{N} \to \mathbb{R}$, the following limit exists: $$\lim_{N \to \infty} \frac{1}{N^2} \sum_{1 \leq m, n \leq N} f(m^2 + n^2).$$ (iii) A variant of a theorem of Bergelson and Richter on ergodic averages along the $\Omega$ function: if $(X,T)$ is a uniquely ergodic system with unique invariant measure $\mu$, then for any $x\in X$ and $f\in C(X)$, $$\lim_{N\to\infty}\frac{1}{N^2}\sum_{1 \leq m, n \leq N} f(T^{\Omega(m^2 + n^2)}x)=\int_Xf \ d\mu.$$