Characterizing Flow Complexity in Transportation Networks using Graph Homology
Abstract
Series-parallel network topologies generally exhibit simplified dynamical behavior and avoid high combinatorial complexity. A comprehensive analysis of how flow complexity emerges with a graph's deviation from series-parallel topology is therefore of fundamental interest. We introduce the notion of a robust -path on a directed acycylic graph, with increasing values of the length reflecting increasing deviations. We propose a graph homology with robust -paths as the bases of its chain spaces. In this framework, the topological simplicity of series-parallel graphs translates into a triviality of higher-order chain spaces. We discuss a correspondence between the space of order-three chains and sites within the network that are susceptible to the Braess paradox, a well-known phenomenon in transportation networks. In this manner, we illustrate the utility of the proposed graph homology in sytematically studying the complexity of flow networks.
Keywords
Cite
@article{arxiv.2403.05749,
title = {Characterizing Flow Complexity in Transportation Networks using Graph Homology},
author = {Shashank A Deshpande and Hamsa Balakrishnan},
journal= {arXiv preprint arXiv:2403.05749},
year = {2024}
}
Comments
7 pages, 3 figures, letter