English

Weil-Petersson Teichm\"uller space

Complex Variables 2018-07-24 v6

Abstract

The paper presents some recent results on the Weil-Petersson geometry theory of the universal Teichm\"uller space, a topic which is important in Teichm\"uller theory and has wide applications to various areas such as mathematical physics, differential equation and computer vision. \noindent (1) It is shown that a sense-preserving homeomorphism hh on the unit circle belongs to the Weil-Petersson class, namely, hh can be extended to a quasiconformal mapping to the unit disk whose Beltrami coefficient is squarely integrable in the Poincar\'e metric if and only if hh is absolutely continuous such that logh\log h' belongs to the Sobolev class H12H^{\frac 12}. This solves an open problem posed by Takhtajan-Teo [TT2] in 2006 and investigated later by Figalli [Fi], Gay-Balmaz-Marsden-Ratiu ([GMR], [GR]) and others. \noindent The intrinsic characterization (1) of the Weil-Petersson class has the following applications which are also explored in this paper: \noindent (2) It is proved that there exists a quasisymmetric homeomorphism of the Weil-Petersson class which belongs neither to the Sobolev class H32H^{\frac 32} nor to the Lipschitz class Λ1\Lambda^1, which was conjectured very recently by Gay-Balmaz-Ratiu [GR] when studying the classical Euler-Poincar\'e equation in the new setting that the involved sense-preserving homeomorphisms on the unit circle belong to the Weil-Petersson class. \noindent (3) It is proved that the flows of the H32H^{\frac 32} vector fields on the unit circle are contained in the Weil-Petersson class, which was also conjectured by Gay-Balmaz-Ratiu [GR] during their above mentioned research. \noindent (4) A new metric is introduced on the Weil-Petersson Teichm\"uller space and is shown to be topologically equivalent to the Weil-Petersson metric.

Keywords

Cite

@article{arxiv.1304.3197,
  title  = {Weil-Petersson Teichm\"uller space},
  author = {Yuliang Shen},
  journal= {arXiv preprint arXiv:1304.3197},
  year   = {2018}
}

Comments

33 pages

R2 v1 2026-06-21T23:57:47.695Z