Meeting time distributions in Bernoulli systems
Abstract
Meeting time is defined as the time for which two orbits approach each other within distance ε in phase space. We show that the distribution of the meeting time is exponential in (p1,...,pk)-Bernoulli systems. In the limit of ε0, the distribution converges to exp(-ατ), where τ is the meeting time normalized by the average. The exponent is shown to be α=Σl=1kpl(1-pl) for the Bernoulli systems.
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