On the moments of the Ulam-Kac adder
Abstract
Let \U(n)\n ≥ 0 be a sequence of independent random variables such that U(n) is distributed uniformly on \0, 1, 2 … n\. The Ulam-Kac adder is the history-dependent random sequence defined by Xn + 1 = Xn + XU(n) with the initial condition X0 = 1. We show that for each m ≥ 1, it holds that E[Xnm]/n approaches a constant cm as n ∞. Loose bounds are provided for the constants cm.
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