On Network Topology Augmentation for Global Connectivity under Regional Failures

Abstract: Several recent studies shed light on the vulnerability of networks against regional failures, which are failures of multiple nodes and links in a physical region due to a natural disaster. The paper defines a novel design framework, called Geometric Network Augmentation (GNA), which determines a set of node pairs and the new cable routes to be deployed between each of them to make the network always remain connected when a regional failure of a given size occurs. With the proposed GNA design framework, we prov… Show more

“…Throughout Sections 2 and 3, we focus on worst-case analysis. In papers considering worst-case problems [2,3,25,28], the network is modeled as an undirected connected geometric graph G = (V, E) with n = |V | nodes and m = |E| edges. The nodes are embedded as points in the Euclidean plane.…”

“…Proposition 1 (Claim 4 of [25]). We are given a connected Planar Graph G = (V, E) with links considered as polygonal chains, a uniform cable cost function, a radius r, a single danger zone Z and two nodes s, t of G. Finding a minimum cost edge between the given nodes with maximal protection for danger zone Z can always be done in polynomial time.…”

“…The edge is along a predefined grid, where it can take a vertical, horizontal, or diagonal line segment. The dotted (green) curve demonstrates the shape of the added cables in a worst-case model (like the model of [25]). There, it avoids a circular area to survive disk failures.…”

“…Throughout Sections 2 and 3, we focus on worst‐case analysis. In papers considering worst‐case problems [2, 3, 25, 28], the network is modeled as an undirected connected geometric graph $$$ \mathcal{G}=\left(\mathcal{V},\mathcal{E}\right) $$$ with $$$ n=\mid \mathcal{V}\kern0.2em \mid $$$ nodes and $$$ m=\mid \mathcal{E}\mid $$$ edges. The nodes are embedded as points in the Euclidean plane.…”

“…We would like to highlight that this article is an extended and thoroughly revised version of our conference paper [28]. In the original study, we put more emphasis on comparing the results of two recent papers [22,25] and investigating the complexities of the problems tackled by them. The current paper has a larger scope, summarizing and charting the complexity results of related prior works (see Tables 1 and 2).…”

The complexity landscape of disaster‐aware network extension problems

“…Throughout Sections 2 and 3, we focus on worst-case analysis. In papers considering worst-case problems [2,3,25,28], the network is modeled as an undirected connected geometric graph G = (V, E) with n = |V | nodes and m = |E| edges. The nodes are embedded as points in the Euclidean plane.…”

“…Proposition 1 (Claim 4 of [25]). We are given a connected Planar Graph G = (V, E) with links considered as polygonal chains, a uniform cable cost function, a radius r, a single danger zone Z and two nodes s, t of G. Finding a minimum cost edge between the given nodes with maximal protection for danger zone Z can always be done in polynomial time.…”

“…The edge is along a predefined grid, where it can take a vertical, horizontal, or diagonal line segment. The dotted (green) curve demonstrates the shape of the added cables in a worst-case model (like the model of [25]). There, it avoids a circular area to survive disk failures.…”

“…Throughout Sections 2 and 3, we focus on worst‐case analysis. In papers considering worst‐case problems [2, 3, 25, 28], the network is modeled as an undirected connected geometric graph $$$ \mathcal{G}=\left(\mathcal{V},\mathcal{E}\right) $$$ with $$$ n=\mid \mathcal{V}\kern0.2em \mid $$$ nodes and $$$ m=\mid \mathcal{E}\mid $$$ edges. The nodes are embedded as points in the Euclidean plane.…”

“…We would like to highlight that this article is an extended and thoroughly revised version of our conference paper [28]. In the original study, we put more emphasis on comparing the results of two recent papers [22,25] and investigating the complexities of the problems tackled by them. The current paper has a larger scope, summarizing and charting the complexity results of related prior works (see Tables 1 and 2).…”

The complexity landscape of disaster‐aware network extension problems

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