On the discrepancy of powers of random variables
Abstract
Let (dn) be a sequence of positive numbers and let (Xn) be a sequence of positive independent random variables. We provide an upper bound for the deviation between the distribution of the mantissaes of (Xndn) and the Benford's law. If dn goes to infinity at a rate at most polynomial, this deviation converges a.s. to 0 as N goes to infinity.
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