Hölder cocycles and ergodic integrals for translation flows on flat surfaces

Q3 Mathematics
A. Bufetov
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引用次数: 5

Abstract

The main results announced in this note are an asymptotic expansion for ergodic integrals of translation flows on flat surfaces of higher genus (Theorem 1) and a limit theorem for such flows (Theorem 2). Given an abelian differential on a compact oriented surface, consider the space $\mathfrak B^+$ of Holder cocycles over the corresponding vertical flow that are invariant under holonomy by the horizontal flow. Cocycles in $\mathfrak B^+$ are closely related to G.Forni's invariant distributions for translation flows [10]. Theorem 1 states that ergodic integrals of Lipschitz functions are approximated by cocycles in $\mathfrak B^+$ up to an error that grows more slowly than any power of time. Theorem 2 is obtained using the renormalizing action of the Teichmuller flow on the space $\mathfrak B^+$. A symbolic representation of translation flows as suspension flows over Vershik's automorphisms allows one to construct cocycles in $\mathfrak B^+$ explicitly. Proofs of Theorems 1, 2 are given in [5].
Hölder平面上平动流的共环和遍历积分
本文宣布的主要结果是高格平面上平动流遍历积分的渐近展开式(定理1)和此类流的极限定理(定理2)。给定紧致定向曲面上的阿贝尔微分,考虑相应垂直流上的Holder环的空间$\mathfrak B^+$,该空间在水平流的完整度下不变。$\mathfrak B^+$中的环与G.Forni的平移流的不变分布[10]密切相关。定理1指出,Lipschitz函数的遍历积分是由$\mathfrak B^+$中的环来近似的,直到误差比时间的任何次幂增长得更慢。定理2是利用空间$\mathfrak B^+$上的Teichmuller流的重整作用得到的。平移流的符号表示为Vershik自同构上的悬架流,允许在$\mathfrak B^+$中显式地构造环。定理1和定理2的证明在[5]中给出。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
0.90
自引率
0.00%
发文量
0
审稿时长
>12 weeks
期刊介绍: Electronic Research Archive (ERA), formerly known as Electronic Research Announcements in Mathematical Sciences, rapidly publishes original and expository full-length articles of significant advances in all branches of mathematics. All articles should be designed to communicate their contents to a broad mathematical audience and must meet high standards for mathematical content and clarity. After review and acceptance, articles enter production for immediate publication. ERA is the continuation of Electronic Research Announcements of the AMS published by the American Mathematical Society, 1995—2007
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