Add to ORKGLength spectral rigidity is the question of under what circumstances the ge-ometry of a surface can be determined, up to isotopy, by knowing only the lengths of its closed geodesics. It is known that this can be done for negatively curved Riemannian surfaces, as well as for negatively-curved cone surfaces. Steps are taken toward showing that this holds also for flat cone surfaces, and it is shown that the lengths of closed geodesics are also enough to determine which of these three cate-gories a geometric surface falls into. Techniques of Gromov, Bonahon, and Otal are explained and adapted, such as topological conjugacy, geodesic currents, Liouville measures, and the average angle between two geometric surfaces. ar X i
A Riemannian manifold is said to be rigid if the length of periodic geodesics (in the case of a clos...
We study geodesics on surfaces in the setting of classical differential geometry. We define the curv...
The goal of this article is to introduce the reader to the theory of intrinsic geometry of convex su...
Length spectral rigidity is the question of under what circumstances the geometry of a surface can b...
This dissertation explores the extent to which lengths of closed geodesics on a Riemannian manifold ...
Abstract. We outline Otal’s proof of marked length spectrum rigidity for negatively curved surfaces....
AbstractVarious authors have shown that isotopy classes of nonpositively curved Riemannian metrics o...
In this paper we consider flat metrics (semi-translation structures) on surfaces of finite type. The...
In this thesis we consider strata of flat metrics coming from quadratic differentials (semi-translat...
AbstractVarious authors have shown that isotopy classes of nonpositively curved Riemannian metrics o...
In this paper we consider flat metrics (semi-translation structures) on surfaces of finite type. The...
The leitmotif of this dissertation is the search for length formulas and sharp constants in relation...
peer reviewedThis article is about inverse spectral problems for hyperbolic surfaces and in particul...
The marked length spectrum (MLS) of a closed negatively curved manifold $(M, g)$ is known to determi...
In [1] V. Guillemin and D. Kazhdan introduced the following definition of spectral rigidity of a Rie...
A Riemannian manifold is said to be rigid if the length of periodic geodesics (in the case of a clos...
We study geodesics on surfaces in the setting of classical differential geometry. We define the curv...
The goal of this article is to introduce the reader to the theory of intrinsic geometry of convex su...
Length spectral rigidity is the question of under what circumstances the geometry of a surface can b...
This dissertation explores the extent to which lengths of closed geodesics on a Riemannian manifold ...
Abstract. We outline Otal’s proof of marked length spectrum rigidity for negatively curved surfaces....
AbstractVarious authors have shown that isotopy classes of nonpositively curved Riemannian metrics o...
In this paper we consider flat metrics (semi-translation structures) on surfaces of finite type. The...
In this thesis we consider strata of flat metrics coming from quadratic differentials (semi-translat...
AbstractVarious authors have shown that isotopy classes of nonpositively curved Riemannian metrics o...
In this paper we consider flat metrics (semi-translation structures) on surfaces of finite type. The...
The leitmotif of this dissertation is the search for length formulas and sharp constants in relation...
peer reviewedThis article is about inverse spectral problems for hyperbolic surfaces and in particul...
The marked length spectrum (MLS) of a closed negatively curved manifold $(M, g)$ is known to determi...
In [1] V. Guillemin and D. Kazhdan introduced the following definition of spectral rigidity of a Rie...
A Riemannian manifold is said to be rigid if the length of periodic geodesics (in the case of a clos...
We study geodesics on surfaces in the setting of classical differential geometry. We define the curv...
The goal of this article is to introduce the reader to the theory of intrinsic geometry of convex su...