Length spectrum characterization of asymptotic Teichmüller space

2018 ◽  
Vol 186 (1) ◽  
pp. 73-91
Author(s):  
Jun Hu ◽  
Francisco G. Jimenez-Lopez
Keyword(s):  
Teichmüller Space ◽  
Length Spectrum ◽  
Teichmuller Space

A characterization of biholomorphic automorphisms of Teichmüller space

2012 ◽  
Vol 154 (1) ◽  
pp. 71-83
Author(s):  
RYOSUKE MINEYAMA ◽  
HIDEKI MIYACHI
Keyword(s):  
Riemann Surface ◽  
Finite Type ◽  
Teichmüller Space ◽  
Teichmuller Space ◽  
Alternative Approach

AbstractIn this paper, we give an alternative approach to Royden–Earle–Kra–Markovic's characterization of biholomorphic automorphisms of Teichmüller space of Riemann surface of analytically finite type.

scholarly journals On the inclusion of the quasiconformal Teichmüller space into the length-spectrum Teichmüller space

2015 ◽  
Vol 179 (2) ◽  
pp. 165-189 ◽  
Author(s):  
D. Alessandrini ◽  
L. Liu ◽  
A. Papadopoulos ◽  
W. Su
Keyword(s):  
Teichmüller Space ◽  
Length Spectrum ◽  
Teichmuller Space

scholarly journals Fenchel–Nielsen coordinates on upper bounded pants decompositions

2015 ◽  
Vol 158 (3) ◽  
pp. 385-397 ◽  
Author(s):  
DRAGOMIR ŠARIĆ
Keyword(s):  
Teichmüller Space ◽  
Hyperbolic Surface ◽  
Length Spectrum ◽  
Teichmuller Space ◽  
Closed Geodesics ◽  
Infinite Type ◽  
Pants Decomposition ◽  
Length Spectrum Metric ◽  
Path Connected ◽  
Simple Closed Geodesics

AbstractLet X0 be an infinite-type hyperbolic surface (whose boundary components, if any, are closed geodesics) which has an upper bounded pants decomposition. The length spectrum Teichmüller space Tls(X0) consists of all surfaces X homeomorphic to X0 such that the ratios of the corresponding simple closed geodesics are uniformly bounded from below and from above. Alessandrini, Liu, Papadopoulos and Su [1] described the Fenchel–Nielsen coordinates for Tls(X0) and using these coordinates they proved that Tls(X0) is path connected. We use the Fenchel–Nielsen coordinates for Tls(X0) to induce a locally bi-Lipschitz homeomorphism between l∞ and Tls(X0) (which extends analogous results by Fletcher [9] and by Allessandrini, Liu, Papadopoulos, Su and Sun [2] for the unreduced and the reduced Tqc(X0)). Consequently, Tls(X0) is contractible. We also characterize the closure in the length spectrum metric of the quasiconformal Teichmüller space Tqc(X0) in Tls(X0).

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