Mathematics – Dynamical Systems
Scientific paper
2009-07-27
J. Stat. Phys. 138 (2010) 701-727
Mathematics
Dynamical Systems
Submitted to J. Stat. Phys
Scientific paper
10.1007/s10955-009-9894-y
We investigate the relations holding among generalized dimensions of invariant measures in dynamical systems and similar quantities defined by the scaling of global averages of powers of return times. Because of a heuristic use of Kac theorem, these latter have been used in place of the former in numerical and experimental investigations; to mark this distinction, we call them return time dimensions. We derive a full set of inequalities linking measure and return time dimensions and we comment on their optimality with the aid of two maps due to von Neumann -- Kakutani and to Gaspard -- Wang. We conjecture the behavior of return time dimensions in a typical system. We only assume ergodicity of the dynamical system under investigation.
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