Multiplicative Spanners in Minor-Free Graphs
Abstract
In FOCS 2017, Borradaille, Le, and Wulff-Nilsen addressed a long-standing open problem by proving that minor-free graphs have light spanners. Specifically, they proved that every Kh-minor-free graph has a (1+ε)-spanner of lightness Oε(h h), hence constant when h and ε are regarded as constants. We extend this result by showing that a more expressive size/stretch tradeoff is available. Specifically: for any positive integer k, every n-node, Kh-minor-free graph has a (2k-1)-spanner with sparsity \[O(h2k+1 · polylog h),\] and a (1+ε)(2k-1)-spanner with lightness \[Oε(h2k+1 · polylog h ).\] We further prove that this exponent 2k+1 is best possible, assuming the girth conjecture. At a technical level, our proofs leverage the recent improvements by Postle (2020) to the remarkable density increment theorem for minor-free graphs.
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