Add to ORKGAny quasi-isometry of the curve complex is bounded distance from a simplicial auto-morphism. As a consequence, the quasi-isometry type of the curve complex determines the homeomorphism type of the surface
Aramayona and Leininger have provided a “finite rigid subset ” X(Σ) of the curve complex C (Σ) of a ...
International audienceLet N be a compact, connected, nonorientable surface of genus g >= 5 with n >=...
In the theory of mapping class groups, “curve complexes ” assume a role similar to the one that buil...
Any quasi-isometry of the curve complex is bounded distance from a simplicial automorphism. As a con...
The {\it curve complex} of a surface was introduced into the study of Teichmüller space by Harvey (s...
We prove that curve complexes of surfaces are finitely rigid: for every orientable surface S of fini...
Rafi and Schleimer recently proved that the natural relation between curve complexes induced by a co...
A rigid set in a curve complex of a surface is a subcomplex such that every locally injective simpli...
We study the arc and curve complex AC(S) of an oriented connected surface S of finite type with punc...
Abstract. We propose a program of studying the coarse geom-etry of combinatorial moduli spaces of su...
For a compact connected nonorientable surface N of genus g with n boundary components, we prove that...
We study the arc complex of a surface with marked points in the interior and on the boundary. We pro...
Abstract. We study the large scale geometry of mapping class groups MCG(S), using hyperbolicity prop...
The curve graph, g, associated to a compact surface Sigma is the 1-skeleton of the curve complex def...
Let S be an orientable surface of innite genus with a nite numberof boundary components. In this wor...
Aramayona and Leininger have provided a “finite rigid subset ” X(Σ) of the curve complex C (Σ) of a ...
International audienceLet N be a compact, connected, nonorientable surface of genus g >= 5 with n >=...
In the theory of mapping class groups, “curve complexes ” assume a role similar to the one that buil...
Any quasi-isometry of the curve complex is bounded distance from a simplicial automorphism. As a con...
The {\it curve complex} of a surface was introduced into the study of Teichmüller space by Harvey (s...
We prove that curve complexes of surfaces are finitely rigid: for every orientable surface S of fini...
Rafi and Schleimer recently proved that the natural relation between curve complexes induced by a co...
A rigid set in a curve complex of a surface is a subcomplex such that every locally injective simpli...
We study the arc and curve complex AC(S) of an oriented connected surface S of finite type with punc...
Abstract. We propose a program of studying the coarse geom-etry of combinatorial moduli spaces of su...
For a compact connected nonorientable surface N of genus g with n boundary components, we prove that...
We study the arc complex of a surface with marked points in the interior and on the boundary. We pro...
Abstract. We study the large scale geometry of mapping class groups MCG(S), using hyperbolicity prop...
The curve graph, g, associated to a compact surface Sigma is the 1-skeleton of the curve complex def...
Let S be an orientable surface of innite genus with a nite numberof boundary components. In this wor...
Aramayona and Leininger have provided a “finite rigid subset ” X(Σ) of the curve complex C (Σ) of a ...
International audienceLet N be a compact, connected, nonorientable surface of genus g >= 5 with n >=...
In the theory of mapping class groups, “curve complexes ” assume a role similar to the one that buil...