A Spanner for the Day After

Abstract

We show how to construct (1+)-spanner over a set P of n points in Rd that is resilient to a catastrophic failure of nodes. Specifically, for prescribed parameters , ∈ (0,1), the computed spanner G has O(-c -6 n n ( n)6 ) edges, where c= O(d). Furthermore, for any k, and any deleted set B ⊂eq P of k points, the residual graph G B is (1+)-spanner for all the points of P except for (1+)k of them. No previous constructions, beyond the trivial clique with O(n2) edges, were known such that only a tiny additional fraction (i.e., ) lose their distance preserving connectivity. Our construction works by first solving the exact problem in one dimension, and then showing a surprisingly simple and elegant construction in higher dimensions, that uses the one-dimensional construction in a black box fashion.