We consider the problem that on large random geometric graphs, random walk-based distances between nodes do not carry global information such as cluster structure. Instead, as the graphs become larger, the distances contain mainly the obsolete information of local density of the nodes. Many distances or similarity measures between nodes on a graph have been proposed but none are both proved to overcome this problem or computationally feasible even for small graphs. We propose new distance functions between nodes for this problem. The idea is to use electrical flows with different energy functions. Our proposed distances are proved analytically to be metrics in $L^p$ spaces, to keep global information, avoiding the problem, and can be comput...
In this paper we introduce new effective resistances on a given network, associated with a positive ...
In graph theory, the resistance distance between any two vertices of a simple connected graph G is e...
The recently developed bag-of-paths (BoP) framework consists in setting a Gibbs-Boltzmann distributi...
We consider the problem that on large random geometric graphs, random walk-based distances between n...
Appearing in Proceedings of the 19th International Conference on Artificial Intelligence and Statist...
The commute distance between two vertices in a graph is the expected time it takes a random walk to ...
There have lately been several suggestions for parametrized distances on a graph that generalize the...
By considering a graph as a network of resistances, Klein and Randić (J Math Chem 12(1):81–95, 1993)...
The analysis of networks or graphs is a highly researched field in the areas of applied mathematics ...
In a seminal paper Stephenson and Zelen (1989) rethought centrality in networks proposing an informa...
The resistance distance is an intrinsic metric on graphs that have been extensively studied by many ...
In a connected graph, nodes can be characterised locally (with their degree k) or globally (e.g. wit...
In a connected graph, nodes can be characterised locally (with their degree k) or globally (e.g. wit...
We survey the recent work on phase transition and distances in various random graph models with gene...
We may view any graph as a network of resistors each having a resistance of 1 Ω. The resistance dist...
In this paper we introduce new effective resistances on a given network, associated with a positive ...
In graph theory, the resistance distance between any two vertices of a simple connected graph G is e...
The recently developed bag-of-paths (BoP) framework consists in setting a Gibbs-Boltzmann distributi...
We consider the problem that on large random geometric graphs, random walk-based distances between n...
Appearing in Proceedings of the 19th International Conference on Artificial Intelligence and Statist...
The commute distance between two vertices in a graph is the expected time it takes a random walk to ...
There have lately been several suggestions for parametrized distances on a graph that generalize the...
By considering a graph as a network of resistances, Klein and Randić (J Math Chem 12(1):81–95, 1993)...
The analysis of networks or graphs is a highly researched field in the areas of applied mathematics ...
In a seminal paper Stephenson and Zelen (1989) rethought centrality in networks proposing an informa...
The resistance distance is an intrinsic metric on graphs that have been extensively studied by many ...
In a connected graph, nodes can be characterised locally (with their degree k) or globally (e.g. wit...
In a connected graph, nodes can be characterised locally (with their degree k) or globally (e.g. wit...
We survey the recent work on phase transition and distances in various random graph models with gene...
We may view any graph as a network of resistors each having a resistance of 1 Ω. The resistance dist...
In this paper we introduce new effective resistances on a given network, associated with a positive ...
In graph theory, the resistance distance between any two vertices of a simple connected graph G is e...
The recently developed bag-of-paths (BoP) framework consists in setting a Gibbs-Boltzmann distributi...