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Extremal exponents of random products of conservative diffeomorphisms

Published 23 Sep 2018 in math.DS | (1809.08619v2)

Abstract: We show that for a $C1$-open and $C{r}$-dense subset of the set of ergodic iterated function systems of conservative diffeomorphisms of a finite-volume manifold of dimension $d\geq 2$, the extremal Lyapunov exponents do not vanish. In particular, the set of non-uniform hyperbolic systems contains a $C1$-open and $Cr$-dense subset of ergodic random products of i.i.d. conservative surface diffeomorphisms.

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