Near-Optimal O(k)-Robust Geometric Spanners

Abstract

For any constants d 1, ε >0, t>1, and any n-point set P⊂Rd, we show that there is a geometric graph G=(P,E) having O(n2 n n) edges with the following property: For any F⊂eq P, there exists F+⊃eq F, |F+| (1+ε)|F| such that, for any pair p,q∈ P F+, the graph G-F contains a path from p to q whose (Euclidean) length is at most t times the Euclidean distance between p and q. In the terminology of robust spanners (Bose al, SICOMP, 42(4):1720--1736, 2013) the graph G is a (1+ε)k-robust t-spanner of P. This construction is sparser than the recent constructions of Buchin, Ol\`ah, and Har-Peled (arXiv:1811.06898) who prove the existence of (1+ε)k-robust t-spanners with nO(d) n edges.