A probabilistic approach to the Erd\"os-Kac theorem for additive functions

Abstract

We present a new perspective of assessing the rates of convergence to the Gaussian and Poisson distributions in the Erd\"os-Kac theorem for additive arithmetic functions of a random integer Jn uniformly distributed over \1,...,n\. Our approach is probabilistic, working directly on spaces of random variables without any use of Fourier analytic methods, and our is more general than those considered in the literature. Our main results are (i) bounds on the Kolmogorov distance and Wasserstein distance between the distribution of the normalized (Jn) and the standard Gaussian distribution, and (ii) bounds on the Kolmogorov distance and total variation distance between the distribution of (Jn) and a Poisson distribution under mild additional assumptions on . Our results generalize the existing ones in the literature.