An Indicator Function Limit Theorem in Dynamical Systems

Abstract

We show by a constructive proof that in all aperiodic dynamical system, for all sequences (an)n∈⊂+ such that an∞ and ann 0 as n∞, there exists a set A∈ having the property that the sequence of the distributions of (1anSn(∈dA-μ(A)))n∈ is dense in the space of all probability measures on .