On the Hausdorff dimension of invariant measures of piecewise smooth circle homeomorphisms

Pub Date : 2024-04-11 DOI:10.1017/etds.2024.25
FRANK TRUJILLO
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Abstract

We show that, generically, the unique invariant measure of a sufficiently regular piecewise smooth circle homeomorphism with irrational rotation number and zero mean nonlinearity (e.g. piecewise linear) has zero Hausdorff dimension. To encode this generic condition, we consider piecewise smooth homeomorphisms as generalized interval exchange transformations (GIETs) of the interval and rely on the notion of combinatorial rotation number for GIETs, which can be seen as an extension of the classical notion of rotation number for circle homeomorphisms to the GIET setting.
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论片断光滑圆同构不变度量的豪斯多夫维度
我们证明,一般来说,具有无理旋转数和零平均非线性(如片断线性)的足够规则的片断光滑圆同构的唯一不变度量的 Hausdorff 维数为零。为了编码这个通用条件,我们将片断光滑同态视为区间的广义区间交换变换(GIET),并依赖于 GIET 的组合旋转数概念,这可以看作是圆同态的经典旋转数概念在 GIET 环境中的扩展。
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