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Partially hyperbolic and transitive dynamics generated by heteroclinic cycles

Published online by Cambridge University Press:  07 March 2001

LORENZO J. DÍAZ
Affiliation:
Dep. Matemática PUC-RJ, Marquês de S. Vicente 225, 22453-900 Rio de Janeiro RJ, Brazil (e-mail: [email protected])
JORGE ROCHA
Affiliation:
Centro de Matemática, Praça Gomes Teixeira, 4050 Porto, Portugal (e-mail: [email protected])

Abstract

We study \mathcal{C}^k-diffeomorphisms, k\ge 1, f: M\to M, exhibiting heterodimensional cycles (i.e. cycles containing periodic points of different stable indices). We prove that if f can not be \mathcal{C}^k-approximated by diffeomorphisms with homoclinic tangencies, then f is in the closure of an open set \mathcal{U}\subset \operatorname{Diff}^k(M) consisting of diffeomorphisms g with a non-hyperbolic transitive set \Lambda_g which is locally maximal and strongly partially hyperbolic (the partially hyperbolic splitting at \Lambda_g has three non-trivial directions). As a consequence, in the case of 3-manifolds, we give new examples of open sets of \mathcal{C}^1-diffeomorphisms for which residually infinitely many sinks or sources coexist (\mathcal{C}^1-Newhouse's phenomenon). We also prove that the occurrence of non-hyperbolic dynamics has persistent character in the unfolding of heterodimensional cycles.

Type
Research Article
Copyright
© 2001 Cambridge University Press

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