Dependable Spanners via Unreliable Edges
Abstract
Let P be a set of n points in Rd, and let , ∈ (0,1) be parameters. Here, we consider the task of constructing a (1+)-spanner for P, where every edge might fail (independently) with probability 1-. For example, for =0.1, about 90\% of the edges of the graph fail. Nevertheless, we show how to construct a spanner that survives such a catastrophe with near linear number of edges. The measure of reliability of the graph constructed is how many pairs of vertices lose (1+)-connectivity. Surprisingly, despite the spanner constructed being of near linear size, the number of failed pairs is close to the number of failed pairs if the underlying graph was a clique. Specifically, we show how to construct such an exact dependable spanner in one dimension of size O(n n), which is optimal. Next, we build an (1+)-spanners for a set P ⊂eq Rd of n points, of size O( C n n ), where C ≈ 1/(d 4/3). Surprisingly, these new spanners also have the property that almost all pairs of vertices have a ≤ 4-hop paths between them realizing this short path.
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