Omer Angel, Alexander E. Holroyd, James B. Martin, James Propp
Published 2009-10-06, updated 2010-07-14Version 3
Holroyd and Propp used Hall's marriage theorem to show that, given a probability distribution pi on a finite set S, there exists an infinite sequence s_1,s_2,... in S such that for all integers k >= 1 and all s in S, the number of i in [1,k] with s_i = s differs from k pi(s) by at most 1. We prove a generalization of this result using a simple explicit algorithm. A special case of this algorithm yields an extension of Holroyd and Propp's result to the case of discrete probability distributions on infinite sets.
Comments: Since posting the preprint, we have learned that our main result was proved by Tijdeman in the 1970s and that his proof is the same as ours
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