On density of positive Lyapunov exponents for C1 symplectic diffeomorphisms
Abstract
Let M be a 2d-dimensional compact connected Riemannian manifold and ω be a symplectic form on M. In this paper, we prove that a symplectic diffeomorphism, with all Lyapunov exponent zero for almost everywhere, can be C1 approximated by one with a positive Lyapunov exponent for a positive-measured subset of M. That is, the set \[ \ f∈ Sym1ω(M)\,| arrayll &The largest Lyapunov exponent λ1(f,\,x)>0\\ & for a positive measure set array \ \] is dense in Sym1ω(M). abstract center
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