Background: Theodore Hill showed, in a paper published in Statistical
Science 1995, that if sequences of random variables $\{X\sb n\}$ are
selected at random in a scale (base) unbiased way, then the mantissa
distributions of the combined sample will converge to Benford's law---a
random probability measure being said to be scale (base) unbiased if its
expected distribution is scale (base) invariant.
IsI wondered if anyone knows of a sensible way of producing such sequences,
assuming that one has available a "good" source of uniform deviates?
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Mark R Diamond
Vision Research Laboratory
The University of Western Australia
Nedlands WA 6907
AUSTRALIA
nospam email: markd at psy dot uwa dot edu dot au
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Disclaimer: The views expressed herein are solely attributable to the
author and do not necessarily reflect the views of the Department of
Psychology or The University of Western Australia.
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