Mario Bessa, Alexandre Rodrigues
Published 2014-03-14Version 1
In this paper we study R-reversible area-preserving maps f on a two-dimensional Riemannian closed manifold M, i.e. diffeomorphisms f such that Ro f=f^{-1}o R where R is an isometric involution on M. We obtain a C1-residual subset where any map inside it is Anosov or else has a dense set of elliptic periodic orbits. As a consequence we obtain the proof of the stability conjecture for this class of maps. Along the paper we also derive the C1-closing lemma for reversible maps and other perturbation toolboxes.
Comments: 12 pages, 1 figure
Abundance of attracting, repelling and elliptic periodic orbits in two-dimensional reversible maps
A proof of the $C^r$ closing lemma and stability conjecture
On dynamics and bifurcations of area-preserving maps with homoclinic tangencies
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