Computing vertex connectivity: New bounds from old techniques

Henzinger M, Rao S, Gabow HN. 2000. Computing vertex connectivity: New bounds from old techniques. Journal of Algorithms. 34(2), 222–250.

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Journal Article | Published | English

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Author
Henzinger, MonikaISTA ; Rao, Satish; Gabow, Harold N.
Abstract
The vertex connectivity κ of a graph is the smallest number of vertices whose deletion separates the graph or makes it trivial. We present the fastest known deterministic algorithm for finding the vertex connectivity and a corresponding separator. The time for a digraph having n vertices and m edges is O(min{κ3 + n, κn}m); for an undirected graph the term m can be replaced by κn. A randomized algorithm finds κ with error probability 1/2 in time O(nm). If the vertices have nonnegative weights the weighted vertex connectivity is found in time O(κ1nmlog(n2/m)) where κ1 ≤ m/n is the unweighted vertex connectivity or in expected time O(nmlog(n2/m)) with error probability 1/2. The main algorithm combines two previous vertex connectivity algorithms and a generalization of the preflow-push algorithm of Hao and Orlin (1994, J. Algorithms17, 424–446) that computes edge connectivity.
Publishing Year
Date Published
2000-02-01
Journal Title
Journal of Algorithms
Publisher
Elsevier
Volume
34
Issue
2
Page
222-250
ISSN
IST-REx-ID

Cite this

Henzinger M, Rao S, Gabow HN. Computing vertex connectivity: New bounds from old techniques. Journal of Algorithms. 2000;34(2):222-250. doi:10.1006/jagm.1999.1055
Henzinger, M., Rao, S., & Gabow, H. N. (2000). Computing vertex connectivity: New bounds from old techniques. Journal of Algorithms. Elsevier. https://doi.org/10.1006/jagm.1999.1055
Henzinger, Monika, Satish Rao, and Harold N. Gabow. “Computing Vertex Connectivity: New Bounds from Old Techniques.” Journal of Algorithms. Elsevier, 2000. https://doi.org/10.1006/jagm.1999.1055.
M. Henzinger, S. Rao, and H. N. Gabow, “Computing vertex connectivity: New bounds from old techniques,” Journal of Algorithms, vol. 34, no. 2. Elsevier, pp. 222–250, 2000.
Henzinger M, Rao S, Gabow HN. 2000. Computing vertex connectivity: New bounds from old techniques. Journal of Algorithms. 34(2), 222–250.
Henzinger, Monika, et al. “Computing Vertex Connectivity: New Bounds from Old Techniques.” Journal of Algorithms, vol. 34, no. 2, Elsevier, 2000, pp. 222–50, doi:10.1006/jagm.1999.1055.

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