Abstract
A t-spanner of a weighted undirected graph G = (V, E), is a subgraph H such that dH(u, v) = t . dG(u, v) for all u, v. V. The sparseness of the spanner can be measured by its size (the number of edges) and weight (the sum of all edge weights), both being important measures of the spanner's quality - in this work we focus on the latter. Specifically, it is shown that for any parameters k >= 1 and epsilon > 0, any weighted graph G on n vertices admits a (2k-1) . (1 + epsilon)-stretch spanner of weight at most w(MST(G)) . O-epsilon(kn(1/k)/log k), where w(MST(G)) is the weight of a minimum spanning tree of G. Our result is obtained via a novel analysis of the classic greedy algorithm, and improves previous work by a factor of O(log k).
| Original language | English |
|---|---|
| Pages (from-to) | 442-452 |
| Number of pages | 11 |
| Journal | AUTOMATA, LANGUAGES, AND PROGRAMMING (ICALP 2014), PT I |
| Volume | 8572 |
| State | Published - 2014 |
| Event | 41st International Colloquium on Automata, Languages and Programming - Copenhagen, DENMARK Duration: 8 Jul 2014 → 11 Jul 2014 |