Sharpness for $C^1$ linearization of planar hyperbolic diffeomorphisms
Dynamical Systems
2013-05-20 v1
Abstract
Planar hyperbolic diffeomorphisms can be referred to two cases: Poincar\'{e} domain (both eigenvalues lie inside the unit circle ) and Siegel domain (one eigenvalue inside but the other outside ). In Poincar\'{e} domain it was proved that smoothness with , where and are both eigenvalues such that , admits linearization and the linearization is actually . While a sharp H\"older exponent is given, an interesting problem is: Is the exponent also sharp? On the other hand, in Siegel domain we only know that smoothness with admits linearization. In this paper we further study the sharpness for linearization in both cases.
Cite
@article{arxiv.1305.4122,
title = {Sharpness for $C^1$ linearization of planar hyperbolic diffeomorphisms},
author = {Wenmeng Zhang and Weinian Zhang},
journal= {arXiv preprint arXiv:1305.4122},
year = {2013}
}
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33 pages