Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Even though there exist numerous nonequivalent definitions of graph curvature, none is known to converge in any limit to any traditional definition of curvature of a Riemannian manifold. Here we show that Ollivier curvature of random geometric graphs in any Riemannian manifold converges in the continuum limit to Ricci curvature of the underlying manifold, but only if the definition of Ollivier graph curvature is properly generalized to apply to mesoscopic graph neighborhoods. This result establishes a rigorous link between a definition of curvature applicable to networks and a traditional definition of curvature of smooth spaces
Bridging geometry and topology, curvature is a powerful and expressiveinvariant. While the utility o...
Abstract. In this paper we study Ollivier’s coarse Ricci-curvature for graphs, and obtain exact form...
Ricci curvature was proposed by Ollivier in a general framework of metric measure spaces, and it has...
Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Eve...
Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Eve...
Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Eve...
Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Eve...
Curvature is a fundamental geometric characteristic of smooth spaces. In recent years different noti...
Curvature is a fundamental geometric characteristic of smooth spaces. In recent years different noti...
The interaction between the study of geometric and analytic aspects of Riemannian manifolds and that...
The interaction between the study of geometric and analytic aspects of Riemannian manifolds and that...
We modify the definition of Ricci curvature of Ollivier of Markov chains on graphs to study the prop...
This article introduces a new approach to discrete curvature based on the concept of effective resis...
Recent advances in emergent geometry and discretized approaches to quantum gravity have relied upon ...
The interaction between the study of geometric and analytic aspects of Riemannian manifolds and that...
Bridging geometry and topology, curvature is a powerful and expressiveinvariant. While the utility o...
Abstract. In this paper we study Ollivier’s coarse Ricci-curvature for graphs, and obtain exact form...
Ricci curvature was proposed by Ollivier in a general framework of metric measure spaces, and it has...
Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Eve...
Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Eve...
Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Eve...
Connections between continuous and discrete worlds tend to be elusive. One example is curvature. Eve...
Curvature is a fundamental geometric characteristic of smooth spaces. In recent years different noti...
Curvature is a fundamental geometric characteristic of smooth spaces. In recent years different noti...
The interaction between the study of geometric and analytic aspects of Riemannian manifolds and that...
The interaction between the study of geometric and analytic aspects of Riemannian manifolds and that...
We modify the definition of Ricci curvature of Ollivier of Markov chains on graphs to study the prop...
This article introduces a new approach to discrete curvature based on the concept of effective resis...
Recent advances in emergent geometry and discretized approaches to quantum gravity have relied upon ...
The interaction between the study of geometric and analytic aspects of Riemannian manifolds and that...
Bridging geometry and topology, curvature is a powerful and expressiveinvariant. While the utility o...
Abstract. In this paper we study Ollivier’s coarse Ricci-curvature for graphs, and obtain exact form...
Ricci curvature was proposed by Ollivier in a general framework of metric measure spaces, and it has...