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ESA
2008
Springer
2008
Springer
A Near-Tight Bound for the Online Steiner Tree Problem in Graphs of Bounded Asymmetry
The edge asymmetry of a directed, edge-weighted graph is defined as the maximum ratio of the weight of antiparallel edges in the graph, and can be used as a measure of the heterogeneity of links in a data communication network. In this paper we provide a near-tight upper bound on the competitive ratio of the Online Steiner Tree problem in graphs of bounded edge asymmetry . This problem has applications in efficient multicasting over networks with non-symmetric links. We show an improved upper bound of O min max log k log , log k log log k , k on the competitive ratio of a simple greedy algorithm, for any request sequence of k terminals. The result almost matches the lower bound of min max log k log , log k log log k , k1(where is an arbitrarily small constant) due to Faloutsos et al. [8] and Angelopoulos [3].
Real-time TrafficAlgorithms | Edge Asymmetry | ESA 2008 | Min Max Log | Upper Bound |
Related Content
| Added | 19 Oct 2010 |
| Updated | 19 Oct 2010 |
| Type | Conference |
| Year | 2008 |
| Where | ESA |
| Authors | Spyros Angelopoulos |
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