Lightweight Near-Additive Spanners
Abstract
An (α,β)-spanner of a weighted graph G=(V,E), is a subgraph H such that for every u,v∈ V, dG(u,v) dH(u,v)α· dG(u,v)+β. The main parameters of interest for spanners are their size (number of edges) and their lightness (the ratio between the total weight of H to the weight of a minimum spanning tree). In this paper we focus on near-additive spanners, where α=1+ for arbitrarily small >0. We show the first construction of light spanners in this setting. Specifically, for any integer parameter k 1, we obtain an (1+,O(k/)k· W(·,·))-spanner with lightness O(n1/k) (where W(·,·) indicates for every pair u, v ∈ V the heaviest edge in some shortest path between u,v). In addition, we can also bound the number of edges in our spanner by O(kn1+3/k).
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