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On universality of algebraic decays in Hamiltonian systems

arXiv:0801.2756 · doi:10.1103/PhysRevLett.100.184101

Abstract

Hamiltonian systems with a mixed phase space typically exhibit an algebraic decay of correlations and of Poincare' recurrences, with numerical experiments over finite times showing system-dependent power-law exponents. We conjecture the existence of a universal asymptotic decay based on results for a Markov tree model with random scaling factors for the transition probabilities. Numerical simulations for different Hamiltonian systems support this conjecture and permit the determination of the universal exponent.

4 pages, 3 figures