One-dimensional dynamical systems and Benford's law |
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| Authors: | Arno Berger Leonid A. Bunimovich Theodore P. Hill |
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| Affiliation: | Department of Mathematics and Statistics, University of Canterbury, Christchurch, New Zealand ; School of Mathematics, Georgia Institute of Technology, Atlanta, Georgia 30332-0160 ; School of Mathematics, Georgia Institute of Technology, Atlanta, Georgia 30332-0160 |
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| Abstract: | Near a stable fixed point at 0 or  , many real-valued dynamical systems follow Benford's law: under iteration of a map  the proportion of values in  with mantissa (base  ) less than  tends to  for all  in  as  , for all integer bases  . In particular, the orbits under most power, exponential, and rational functions (or any successive combination thereof), follow Benford's law for almost all sufficiently large initial values. For linearly-dominated systems, convergence to Benford's distribution occurs for every  , but for essentially nonlinear systems, exceptional sets may exist. Extensions to nonautonomous dynamical systems are given, and the results are applied to show that many differential equations such as  , where  is  with  , also follow Benford's law. Besides generalizing many well-known results for sequences such as  or the Fibonacci numbers, these findings supplement recent observations in physical experiments and numerical simulations of dynamical systems. |
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| Keywords: | Dynamical systems Benford's law uniform distribution mod~1 attractor |
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