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WG
2004
Springer
2004
Springer
Collective Tree Spanners and Routing in AT-free Related Graphs
In this paper we study collective additive tree spanners for families of graphs that either contain or are contained in AT-free graphs. We say that a graph G = (V, E) admits a system of µ collective additive tree rspanners if there is a system T (G) of at most µ spanning trees of G such that for any two vertices x, y of G a spanning tree T ∈ T (G) exists such that dT (x, y) ≤ dG(x, y) + r. Among other results, we show that AT-free graphs have a system of two collective additive tree 2-spanners (whereas there are trapezoid graphs that do not admit any additive tree 2-spanner). Furthermore, based on this collection, we derive a compact and efficient routing scheme. Also, any DSP-graph (there exists a dominating shortest path) admits an additive tree 4-spanner, a system of two collective additive tree 3-spanners and a system of five collective additive tree 2-spanners. Article Type Communicated by Submitted Revised regular paper S. Khuller January 2005 January 2006 Results of this...
Real-time TrafficAdditive Tree 2-spanners | Additive Tree Spanners | Collective Additive Tree | Computer Science | WG 2004 |
| Added | 03 Jul 2010 |
| Updated | 03 Jul 2010 |
| Type | Conference |
| Year | 2004 |
| Where | WG |
| Authors | Feodor F. Dragan, Chenyu Yan, Derek G. Corneil |
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