Better Lower Bounds for Shortcut Sets and Additive Spanners via an   Improved Alternation Product

Kevin Lu; Virginia Vassilevska Williams; Nicole Wein; Zixuan Xu

arXiv:2110.15809·cs.DS·September 27, 2023·1 cites

Better Lower Bounds for Shortcut Sets and Additive Spanners via an Improved Alternation Product

Kevin Lu, Virginia Vassilevska Williams, Nicole Wein, Zixuan Xu

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Abstract

We obtain improved lower bounds for additive spanners, additive emulators, and diameter-reducing shortcut sets. Spanners and emulators are sparse graphs that approximately preserve the distances of a given graph. A shortcut set is a set of edges that when added to a directed graph, decreases its diameter. The previous best known lower bounds for these three structures are given by Huang and Pettie [SWAT 2018]. For $O (n)$ -sized spanners, we improve the lower bound on the additive stretch from $Ω (n^{1/11})$ to $Ω (n^{2/21})$ . For $O (n)$ -sized emulators, we improve the lower bound on the additive stretch from $Ω (n^{1/18})$ to $Ω (n^{1/16})$ . For $O (m)$ -sized shortcut sets, we improve the lower bound on the graph diameter from $Ω (n^{1/11})$ to $Ω (n^{1/8})$ . Our key technical contribution, which is the basis of all of our bounds, is an improvement of a graph…

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TopicsComplexity and Algorithms in Graphs · Optimization and Search Problems · Stochastic Gradient Optimization Techniques