Dynamic Light Spanners in Doubling Metrics

Abstract

A t-spanner of a point set X in a metric space (X, δ) is a graph G with vertex set P such that, for any pair of points u,v ∈ X, the distance between u and v in G is at most t times δ(u,v). We study the problem of maintaining a spanner for a dynamic point set X -- that is, when X undergoes a sequence of insertions and deletions -- in a metric space of constant doubling dimension. For any constant >0, we maintain a (1+)-spanner of P whose total weight remains within a constant factor of the weight of the minimum spanning tree of X. Each update (insertion or deletion) can be performed in poly( ) time, where denotes the aspect ratio of X. Prior to our work, no efficient dynamic algorithm for maintaining a light-weight spanner was known even for point sets in low-dimensional Euclidean space.

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