Existence of the Lyapunov exponent for S-unimodal maps

Abstract

In this paper, we show that for any S-unimodal map T on [0,1] with a non-flat critical point the Lyapunov exponent exists for Lebesgue almost every point and is equal to a constant λT∈R. Moreover, λT=0 if and only if T admits neither an absolutely continuous T-invariant probability measure with positive entropy nor a strictly stable periodic orbit. Consequently, if an S-unimodal map with a non-flat critical point is infinitely renormalizable or non-statistical then for Lebesgue almost every x∈ [0,1] the Lyapunov exponent along the orbit of x exists and is equal to 0. A key ingredient is the following result of independent interest. If an S-unimodal map with a non-flat critical point has no periodic attractor then for Lebesgue almost every x∈ [0,1] the lower Lyapunov exponent along the orbit of x is non-negative. This shows that, in the absence of periodic attractors, exponential contraction cannot occur along the orbit of Lebesgue almost every point.

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