Fault-Tolerant Bounded Flow Preservers
Abstract
Given a directed graph with vertices, edges and a designated source vertex , we consider the question of finding a sparse subgraph of that preserves the flow from up to a given threshold even after failure of edges. We refer to such subgraphs as -fault-tolerant bounded-flow-preserver (-FT-BFP). Formally, for any of at most edges and any , the -max-flow in is equal to -max-flow in , if the latter is bounded by , and at least otherwise. Our contributions are summarized as follows: 1. We provide a polynomial time algorithm that given any graph constructs a -FT-BFP of with at most edges. 2. We also prove a matching lower bound of on the size of -FT-BFP. In particular, we show that for every , there exists an -vertex directed graph whose optimal -FT-BFP contains edges. 3. Furthermore, we show that the problem of computing approximate -FT-BFP is NP-hard for any approximation ratio that is better than .
Keywords
Cite
@article{arxiv.2404.16217,
title = {Fault-Tolerant Bounded Flow Preservers},
author = {Shivam Bansal and Keerti Choudhary and Harkirat Dhanoa and Harsh Wardhan},
journal= {arXiv preprint arXiv:2404.16217},
year = {2024}
}
Comments
12 pages, 2 figures