Weighted Emulators with Local Heaviest Edges Stretch for Undirected Graphs

Abstract

We introduce a generalized family of ( 2· k2 -1, 2· k2 · W1 +\0,2·(k2-2)\· W2 )-emulators with O (n1+1k) edges, for any k∈N, where Wi is the ith heaviest edge on a shortest path between two vertices. Our construction generalizes the +2W1-spanner of size O(n32) and the +4W1-emulator of size O (n43), both by Elkin, Gitlitz and Neiman [DISC'21 and DICO'23]. When k is even, these are (k-1,k· W1 + (k-4)· W2)-emulators and when k is odd, these are (k-2,(k+1)· W1 + (k-3) · W2)-emulators. Our framework not only expands known constructions for weighted graphs but also yields an improved stretch over state of the art emulators and spanners for unweighted graphs within a specific distance regime. In particular, for all vertex pairs separated by a distance of δ ≤ O(3k2), our construction improves upon the seminal additive + O(δ1-1k)-emulator of size O(n1+12k+1-1) by Thorup and Zwick [SODA'06].