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Communications in Mathematical Sciences
Volume 22 (2024)
Number 5
Differentiable Hartman-Grobman Theorem via modulus of continuity: A sharp result on linearization in general Banach space
Pages: 1361 – 1396
DOI: https://dx.doi.org/10.4310/CMS.2024.v22.n5.a8
Authors
Abstract
As is well known the classical Hartman–Grobman theorem states that a $C^1$ mapping can be $C^0$ linearized near its hyperbolic fixed point in $\mathbb{R}^n$. However, it is quite nontrivial to guarantee the local homeomorphism to be differentiable. Recently, the regularity assumption on derivative of the mapping has been weakened to Hölder’s type, significantly improving the work of $C^\infty$, but still unknown for only differentiable case. We will try to touch this question in this paper. Without Hölder’s type, we first consider the existence and regularity of weak-stable manifolds for homeomorphisms with contraction in a Banach space, and further study linearization of mappings near hyperbolic fixed points. More precisely, we propose an Integrability Condition for regularity on linearization which is proved to be sharp, and establish a differentiable Hartman–Grobman theorem via modulus of continuity in a general Banach space. Thus we provide an almost complete answer to the question mentioned above.
Keywords
weak-stable manifolds, contractions, differentiable Hartman–Grobman theorem, modulus of continuity, sharp Integrability Condition
2010 Mathematics Subject Classification
35B41, 37L30
Received 20 October 2022
Accepted 22 November 2023
Published 15 July 2024