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

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 G R is a bounded completely multiplicative function, then the following limit exists: N ∞ 1N2 Σ1 ≤ m, n ≤ N f(m + i n). (ii) An answer to a special case of a question of Frantzikinakis and Host: for any completely multiplicative real-valued function f: N R, the following limit exists: N ∞ 1N2 Σ1 ≤ m, n ≤ N f(m2 + n2). (iii) A variant of a theorem of Bergelson and Richter on ergodic averages along the function: if (X,T) is a uniquely ergodic system with unique invariant measure μ, then for any x∈ X and f∈ C(X), N∞1N2Σ1 ≤ m, n ≤ N f(T(m2 + n2)x)=∫Xf \ dμ.