Random power series near the endpoint of the convergence interval

Abstract

In this paper, we are going to consider power series Σn=1∞ anxn, where the coefficients an are chosen independently at random from a finite set with uniform distribution. We prove that if the expected value of the coefficients is positive (resp. negative), then x 1-Σn=1∞ anxn=∞ (resp. x 1-Σn=1∞ anxn=-∞) with probability 1. Also, if the expected value of the coefficients is 0, then x 1-Σn=1∞ anxn=∞, x 1-Σn=1∞ anxn=-∞ with probability 1. We investigate the analogous question in terms of Baire categories.