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Breaching the 2-approximation barrier for connectivity augmentation: a reduction to Steiner tree

Jarosław Byrka, Fabrizio Grandoni, Afrouz Jabal Ameli

202020 citationsDOI

Abstract

The basic goal of survivable network design is to build a cheap network that maintains the connectivity between given sets of nodes despite the failure of a few edges/nodes. The Connectivity Augmentation Problem (CAP) is arguably one of the most basic problems in this area: given a k(-edge)-connected graph G and a set of extra edges (links), select a minimum cardinality subset A of links such that adding A to G increases its edge connectivity to k+1. Intuitively, one wants to make an existing network more reliable by augmenting it with extra edges. The best known approximation factor for this NP-hard problem is 2, and this can be achieved with multiple approaches (the first such result is in [Frederickson and Jájá’81]).

Topics & Concepts

Steiner tree problemCardinality (data modeling)Approximation algorithmComputer scienceEnhanced Data Rates for GSM EvolutionCombinatoricsReduction (mathematics)GraphSet (abstract data type)MathematicsDiscrete mathematicsTelecommunicationsData miningProgramming languageGeometryComplexity and Algorithms in GraphsInterconnection Networks and SystemsGraphene research and applications
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