Mathematics – Dynamical Systems
Scientific paper
2008-01-16
Nonlinearity 21 1719-1743 (2008)
Mathematics
Dynamical Systems
25 pages, 7 figures. Submitted for publication
Scientific paper
10.1088/0951-7715/21/8/003
We consider families of dynamics that can be described in terms of Perron-Frobenius operators with exponential mixing properties. For piecewise C^2 expanding interval maps we rigorously prove continuity properties of the drift J(l) and of the diffusion coefficient D(l) under parameter variation. Our main result is that D(l) has a modulus of continuity of order O(|dl||log|dl|)^2), i.e. D(l) is Lipschitz continuous up to quadratic logarithmic corrections. For a special class of piecewise linear maps we provide more precise estimates at specific parameter values. Our analytical findings are verified numerically for the latter class of maps by using exact formulas for the transport coefficients. We numerically observe strong local variations of all continuity properties.
Howard Phil J.
Keller Gerhard
Klages Rainer
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