Scattering and Sparse Partitions, and Their Applications

Abstract

A partition \(\mathcal{P}\) of a weighted graph \(G\) is \((\sigma,\tau,\Delta)\) -sparse if every cluster has diameter at most \(\Delta\) , and every ball of radius \(\Delta/\sigma\) intersects at most \(\tau\) clusters. Similarly, \(\mathcal{P}\) is \((\sigma,\tau,\Delta)\) -scattering if instead for balls, we require that every shortest path of length at most \(\Delta/\sigma\) intersects at most \(\tau\) clusters. Given a graph \(G\) that admits a \((\sigma,\tau,\Delta)\) -sparse partition for all \(\Delta > 0\) , Jia et al. constructed a solution for the Universal Steiner Tree problem (and also Universal TSP) with stretch \(O(\tau\sigma^{2} \log _{\tau}n)\) . Given a graph \(G\) that admits a \((\sigma,\tau,\Delta)\) -scattering partition for all \(\Delta > 0\) , we construct a solution for the Steiner Point Removal problem with stretch \(O(\tau^{3}\sigma^{3})\) . 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.