Add to ORKGIt is shown in this paper that any sphere in an infinite-dimensional Teichmuller space is not strictly convex with respect to geodesies. This result is a generalization of a result obtained by the author, where only the case where the Fuchsian group is of the second kind is investigated.08924-93
This paper investigates compact, embedded, strictly convex hypersurfaces in the unit sphere and give...
Let T(S) be the Teichmuller space of a Riemann surface S. By definition, a geodesic disc in T(S) is ...
The Teichmüller space of a surface with boundary is the space of all isotopy classes of hyperbolic m...
This paper is to discuss the problem whether a sphere in a Teichmuller space is strictly convex with...
<正> This paper is to discuss the problem whether a sphere in a Teichmuller space is strictly c...
The purpose of this paper is to survey the new advances in the research on the metric geometry of in...
In this paper the following phenomena of geodesics in an infinite-dimensional Teichmuller space are ...
In this paper we construct a closed geodesic in any infinite-dimensional Teichmuller space. The cons...
We prove that the Teichmüller space of surfaces of genus g with p punctures contains balls which ar...
It is well known that a finite dimensional Teichmuller space is a straight geodesicspace in the sens...
The non-uniqueness of geodesics joining two given points in universal Teichmuller space is proved in...
For a non-compact, complete and simply connected manifold M without conjugate points, we prove that ...
Abstract. For a non-compact, complete and simply connected manifold M without conjugate points, we p...
Let G be a Fuchsian group. Any [mu] in the Teichmuller space T(Gamma) determines a quasi-circle f(mu...
ABSTRACT. We consider Riemann surfaces of infinite type and their reduced Teichmüller spaces. The r...
This paper investigates compact, embedded, strictly convex hypersurfaces in the unit sphere and give...
Let T(S) be the Teichmuller space of a Riemann surface S. By definition, a geodesic disc in T(S) is ...
The Teichmüller space of a surface with boundary is the space of all isotopy classes of hyperbolic m...
This paper is to discuss the problem whether a sphere in a Teichmuller space is strictly convex with...
<正> This paper is to discuss the problem whether a sphere in a Teichmuller space is strictly c...
The purpose of this paper is to survey the new advances in the research on the metric geometry of in...
In this paper the following phenomena of geodesics in an infinite-dimensional Teichmuller space are ...
In this paper we construct a closed geodesic in any infinite-dimensional Teichmuller space. The cons...
We prove that the Teichmüller space of surfaces of genus g with p punctures contains balls which ar...
It is well known that a finite dimensional Teichmuller space is a straight geodesicspace in the sens...
The non-uniqueness of geodesics joining two given points in universal Teichmuller space is proved in...
For a non-compact, complete and simply connected manifold M without conjugate points, we prove that ...
Abstract. For a non-compact, complete and simply connected manifold M without conjugate points, we p...
Let G be a Fuchsian group. Any [mu] in the Teichmuller space T(Gamma) determines a quasi-circle f(mu...
ABSTRACT. We consider Riemann surfaces of infinite type and their reduced Teichmüller spaces. The r...
This paper investigates compact, embedded, strictly convex hypersurfaces in the unit sphere and give...
Let T(S) be the Teichmuller space of a Riemann surface S. By definition, a geodesic disc in T(S) is ...
The Teichmüller space of a surface with boundary is the space of all isotopy classes of hyperbolic m...