Benfordness of Measurements Resulting from Box Fragmentation
Abstract
We make progress on a conjecture made by [DM], which states that the d-dimensional frames of m-dimensional boxes resulting from a fragmentation process satisfy Benford's law for all 1 ≤ d ≤ m. We provide a sufficient condition for Benford's law to be satisfied, namely that the maximum product of d sides is itself a Benford random variable. Motivated to produce an example of such a fragmentation process, we show that processes constructed from log-uniform proportion cuts satisfy the maximum criterion for d=1.
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