Thorup-Zwick Emulators are Universally Optimal Hopsets

Abstract

A (β,ε)-hopset is, informally, a weighted edge set that, when added to a graph, allows one to get from point a to point b using a path with at most β edges ("hops") and length (1+ε)dist(a,b). In this paper we observe that Thorup and Zwick's sublinear additive emulators are also actually (O(k/ε)k,ε)-hopsets for every ε>0, and that with a small change to the Thorup-Zwick construction, the size of the hopset can be made O(n1+12k+1-1). As corollaries, we also shave "k" factors off the size of Thorup and Zwick's sublinear additive emulators and the sparsest known (1+ε,O(k/ε)k-1)-spanners, due to Abboud, Bodwin, and Pettie.