C1-Genericity of Symplectic Diffeomorphisms and Lower Bounds for Topological Entropy

Abstract

There is a C1-residual (Baire second class) subset R of symplectic diffeomorphisms on 2d-dimensional manifold, d≥ 1, such that for every non-Anosov f in R its topological entropy is lower bounded by the supremum of the Lyapunov exponents of their hyperbolic periodic points in the unbreakable central subbundle (i.e., central direction with no dominated splitting) of f. The previous result deals with the fact that for f in a residual set R of symplectic diffeomorphisms (containing R) satisfies a trichotomy: or f is Anosov or f is robustly transitive partially hyperbolic with unbreakable center of dimension 2m, 0 < m < d, or f has totally elliptic periodic points dense on M. In the second case, we also show the existence of a sequence of m- elliptic periodic points converging to M. Indeed, R contains an open and dense subset.