Stable Transitivity of Certain Noncompact Extensions of Hyperbolic Systems

Autor: Andrei Török, Viorel Niţică, Ian Melbourne
Rok vydání: 2005
Předmět:
Zdroj: Annales Henri Poincaré. 6:725-746
ISSN: 1424-0661
1424-0637
DOI: 10.1007/s00023-005-0221-0
Popis: Let ƒ : X → X be the restriction to a hyperbolic basic set of a smooth diffeomorphism. We find several criteria for transitivity of noncompact connected Lie group extensions. As a consequence, we find transitive extensions for any finite-dimensional connected Lie group extension. If, in addition, the group is perfect and has an open set of elements that generate a compact subgroup, we find open sets of stably transitive extensions. In particular, we find stably transitive SL(2, R)-extensions. More generally, we find stably transitive Sp(2n-R)-extensions for all n ≥ 1. For the Euclidean groups SE(n) with n ≥ 4 even, we obtain a new proof of a result of Melbourne and Nicol stating that there is an open and dense set of extensions that are transitive. For groups of the form K × Rn where K is compact, a separation condition is necessary for transitivity. Provided X is a hyperbolic attractor, we show that an open and dense set of extensions satisfying the separation condition are transitive. This generalises a result of Nitica and Pollicott for Rn-extensions.
Databáze: OpenAIRE
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