To expand the toolbox available to network science, we study the isomorphism between distance and Fuzzy (proximity or strength) graphs. Distinct transitive closures in Fuzzy graphs lead to closures of their isomorphic distance graphs with widely different structural properties. For instance, the All Pairs Shortest Paths (APSP) problem, based on the Dijkstra algorithm, is equivalent to a metric closure, which is only one of the possible ways to calculate shortest paths in weighted graphs. We show that different closures lead to different distortions of the original topology of weighted graphs. Therefore, complex network analyses that depend on the calculation of shortest paths on weighted graphs should take into account the closure choice an...
Researchers have proposed a variety of metrics to measure important graph properties, for instance, ...
We study transitivity properties of edge weights in complex networks. We show that enforcing transit...
Metric graphs are meaningful objects for modeling complex structures that arise in many real-world a...
The analysis of networks or graphs is a highly researched field in the areas of applied mathematics ...
In this article we define Steiner and upper Steiner distances in connected fuzzy graphs by combining...
Distance is an important parameter in any networks/ graphs. The idea of strong sum distance in the f...
AbstractThis paper is primarily expository, relating elements of graph theory to a computational the...
This thesis presents techniques of modeling large and dense networks and methods of computing distan...
The analysis of networks involves several crucial parameters. In this paper, we consider the closene...
The problem of computing distances and shortest paths between vertices in graphs is one of the funda...
We study the properties of complex networks embedded in a Euclidean space of communicability distanc...
Abstract. The concept of distance is one of the basic concepts in Mathematics. How far two objects (...
Motivated by complex networks analysis, we study algorithms that compute metric properties of real-...
We define a new family of similarity and distance measures on graphs, and explore their theoretical ...
Abstract. This work provides the first detailed investigation of the dis-turbed diffusion scheme FOS...
Researchers have proposed a variety of metrics to measure important graph properties, for instance, ...
We study transitivity properties of edge weights in complex networks. We show that enforcing transit...
Metric graphs are meaningful objects for modeling complex structures that arise in many real-world a...
The analysis of networks or graphs is a highly researched field in the areas of applied mathematics ...
In this article we define Steiner and upper Steiner distances in connected fuzzy graphs by combining...
Distance is an important parameter in any networks/ graphs. The idea of strong sum distance in the f...
AbstractThis paper is primarily expository, relating elements of graph theory to a computational the...
This thesis presents techniques of modeling large and dense networks and methods of computing distan...
The analysis of networks involves several crucial parameters. In this paper, we consider the closene...
The problem of computing distances and shortest paths between vertices in graphs is one of the funda...
We study the properties of complex networks embedded in a Euclidean space of communicability distanc...
Abstract. The concept of distance is one of the basic concepts in Mathematics. How far two objects (...
Motivated by complex networks analysis, we study algorithms that compute metric properties of real-...
We define a new family of similarity and distance measures on graphs, and explore their theoretical ...
Abstract. This work provides the first detailed investigation of the dis-turbed diffusion scheme FOS...
Researchers have proposed a variety of metrics to measure important graph properties, for instance, ...
We study transitivity properties of edge weights in complex networks. We show that enforcing transit...
Metric graphs are meaningful objects for modeling complex structures that arise in many real-world a...