On Sums of Indicator Functions in Dynamical Systems
Abstract
In this paper, we are interested in the limit theorem question for sums of indicator functions. We show that in every aperiodic dynamical system, for every increasing sequence (an)n∈⊂+ such that an∞ and ann 0 as n∞, there exists a measurable set A such that the sequence of the distributions of the partial sums 1anΣi=0n-1(∈dA-μ(A)) Ti is dense in the set of the probability measures on . Further, in the ergodic case, we prove that there exists a dense Gδ of such sets.
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