Jairo Bochi
Published 2002-02-22Version 1
We show that, for any compact surface, there is a residual (dense $G_\delta$) set of $C^1$ area preserving diffeomorphisms which either are Anosov or have zero Lyapunov exponents a.e. This result was announced by R. Mane, but no proof was available. We also show that for any fixed ergodic dynamical system over a compact space, there is a residual set of continuous $SL(2,R)$-cocycles which either are uniformly hyperbolic or have zero exponents a.e.
Comments: 28 pages, 1 figure. This is a revised, more readable, version of the preprint distributed in 2000
Journal: Ergodic Theory and Dynamical Systems, 22 (2002), 1667-1696
Genericity of non-uniform hyperbolicity in dimension 3
Genericity of historic behavior for maps and flows
Zero Lyapunov exponents of the Hodge bundle
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