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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 S1S^1) and Siegel domain (one eigenvalue inside S1S^1 but the other outside S1S^1). In Poincar\'{e} domain it was proved that C1,αC^{1,\alpha} smoothness with α0:=1logλ2/logλ1<α1\alpha_0:=1-\log|\lambda_2|/\log|\lambda_1|<\alpha\le 1, where λ1\lambda_1 and λ2\lambda_2 are both eigenvalues such that 0<λ1<λ2<10<|\lambda_1|<|\lambda_2|<1, admits C1C^1 linearization and the linearization is actually C1,βC^{1,\beta}. While a sharp H\"older exponent β>0\beta>0 is given, an interesting problem is: Is the exponent α0\alpha_0 also sharp? On the other hand, in Siegel domain we only know that C1,αC^{1,\alpha} smoothness with α(0,1]\alpha\in (0,1] admits C1C^1 linearization. In this paper we further study the sharpness for C1C^1 linearization in both cases.

Keywords

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}
}

Comments

33 pages

R2 v1 2026-06-22T00:18:17.993Z