Scattering and Sparse Partitions, and their Applications

Abstract

A partition P of a weighted graph G is (σ,τ,)-sparse if every cluster has diameter at most , and every ball of radius /σ intersects at most τ clusters. Similarly, P is (σ,τ,)-scattering if instead for balls we require that every shortest path of length at most /σ intersects at most τ clusters. Given a graph G that admits a (σ,τ,)-sparse partition for all >0, Jia et al. [STOC05] constructed a solution for the Universal Steiner Tree problem (and also Universal TSP) with stretch O(τσ2τ n). Given a graph G that admits a (σ,τ,)-scattering partition for all >0, we construct a solution for the Steiner Point Removal problem with stretch O(τ3σ3). We then construct sparse and scattering partitions for various different graph families, receiving many new results for the Universal Steiner Tree and Steiner Point Removal problems.