Ulam meets Turing: constructing quadratic maps with non-computable SRB measures

Abstract

In 1946, S. Ulam invented Monte Carlo method, which has since become the standard numerical technique for making statistical predictions for long-term behaviour of dynamical systems. We show that this, or in fact any other numerical approach can fail for the simplest non-linear discrete dynamical systems given by the logistic maps fa(x)=ax(1-x) of the unit interval. We show that there exist computable real parameters a∈ (0,4) for which almost every orbit of fa has the same asymptotical statistical distribution in [0,1], but this limiting distribution is not Turing computable.

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