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Survivable network activation problems

Author:

Zeev NutovAuthors Info & Claims

Theoretical Computer Science, Volume 514

Pages 105 - 115

https://doi.org/10.1016/j.tcs.2012.10.054

Published: 01 November 2013 Publication History

Abstract

In the Survivable Networks Activation problem we are given a graph G=(V,E), S@?V, a family {f^u^v(x"u,x"v):uv@?E} of monotone non-decreasing activating functions from R"+^2 to {0,1} each, and connectivity requirements{r(uv):uv@?R} over a set R of requirement edges on V. The goal is to find a weight assignmentw={w"v:v@?V} of minimum total weight w(V)=@?"v"@?"Vw"v, such that in the activated graphG"w=(V,E"w), where E"w={uv:f^u^v(w"u,w"v)=1}, the following holds: for each uv@?R, the activated graph G"w contains r(uv) pairwise edge-disjoint uv-paths such that no two of them have a node in S@?{u,v} in common. This problem was suggested recently by Panigrahi (2011) [19], generalizing the Node-Weighted Survivable Network and the Minimum-Power Survivable Network problems, as well as several other problems with motivation in wireless networks. We give new approximation algorithms for this problem. For undirected/directed graphs, our ratios are O(klogn) for k-Out/In-connected Subgraph Activation and k-Connected Subgraph Activation. For directed graphs this solves a question from Panigrahi (2011) [19] for k=1, while for the min-power case and k arbitrary this solves a question from Nutov (2010) [16]. For other versions on undirected graphs, our ratios match the best known ones for the Node-Weighted Survivable Network problem (Nutov, 2009 [14]).

References

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Bhaskara, A., Charikar, M., Chlamtac, E., Feige, U. and Vijayaraghavan, A., Detecting high log-densities: an O(n1/4) approximation for densest k-subgraph. In: STOC, pp. 201-210.

[2]

Chuzhoy, J. and Khanna, S., Algorithms for single-source vertex connectivity. In: FOCS, pp. 105-114.

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N. Cohen, Z. Nutov, Approximating minimum-power edge-multicovers, in: CSR, 2012, pp. 64-75.

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Fakcharoenphol, J. and Laekhanukit, B., An O(log2k)-approximation algorithm for the k-vertex connected spanning subgraph problem. In: STOC, pp. 153-158.

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Fleischer, L., Jain, K. and Williamson, D., Iterative rounding 2-approximation algorithms for minimum-cost vertex connectivity problems. J. Comput. Syst. Sci. v72 i5. 838-867.

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Frank, A., Rooted k-connections in digraphs. Discrete Applied Math. v157 i6. 1242-1254.

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Hajiaghayi, M.T., Kortsarz, G., Mirrokni, V.S. and Nutov, Z., Power optimization for connectivity problems. Math. Programming. v110 i1. 195-208.

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Johnson, D.S., Approximation Algorithms for Combinatorial Problems. vol. 9. 1974.

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Klein, P. and Ravi, R., A nearly best-possible approximation algorithm for node-weighted Steiner trees. J. of Algorithms. v19. 104-115.

[10]

Kortsarz, G. and Nutov, Z., Approximating node-connectivity problems via set covers. Algorithmica. v37. 75-92.

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Kortsarz, G. and Nutov, Z., Approximating k-node connected subgraphs via critical graphs. SIAM J. Comput. v35 i1. 247-257.

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Kortsarz, G. and Nutov, Z., Approximating minimum-cost connectivity problems. In: Gonzalez, T.F. (Ed.), Approximation Algorithms and Metaheuristics, Chapman & Hall/CRC.

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Lando, Y. and Nutov, Z., On minimum power connectivity problems. J. Discrete Algorithms. v8 i2. 164-173.

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Z. Nutov, Approximating minimum cost connectivity problems via uncrossable bifamilies and spider-cover decompositions, in: FOCS, pp. 417-426, 2009, Transactions on Algorithms (in press).

Digital Library

[15]

Nutov, Z., A note on rooted survivable networks. Inform. Process. Lett. v109 i19. 1114-1119.

[16]

Nutov, Z., Approximating minimum power covers of intersecting families and directed edge-connectivity problems. Theoretical Computer Science. v411 i26-28. 2502-2512.

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Nutov, Z., Approximating Steiner networks with node-weights. SIAM J. Comput. v37 i7. 3001-3022.

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Z. Nutov, Approximating subset k-connectivity problems, J. Discrete Algorithms (in press).

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Panigrahi, D., Survivable network design problems in wireless networks. In: SODA, pp. 1014-1027.

Cited By

Nutov Z(2018)ErratumACM Transactions on Algorithms10.1145/318699114:3(1-8)Online publication date: 16-Jun-2018
https://dl.acm.org/doi/10.1145/3186991
Fukunaga T(2017)Spider Covers for Prize-Collecting Network Activation ProblemACM Transactions on Algorithms10.1145/313274213:4(1-31)Online publication date: 25-Oct-2017
https://dl.acm.org/doi/10.1145/3132742
Fukunaga TIndyk P(2015)Spider covers for prize-collecting network activation problemProceedings of the twenty-sixth annual ACM-SIAM symposium on Discrete algorithms10.5555/2722129.2722131(9-24)Online publication date: 4-Jan-2015
https://dl.acm.org/doi/10.5555/2722129.2722131

Survivable network activation problems
1. Mathematics of computing
  1. Discrete mathematics
    1. Graph theory
  2. Mathematical analysis
    1. Functional analysis
2. Theory of computation
  1. Design and analysis of algorithms
    1. Graph algorithms analysis

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cover image Theoretical Computer Science

Theoretical Computer Science Volume 514, Issue

November, 2013

121 pages

ISSN:0304-3975

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Copyright © Elsevier B.V. © 2012.

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Elsevier Science Publishers Ltd.

United Kingdom

Publication History

Published: 01 November 2013

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Cited By

Nutov Z(2018)ErratumACM Transactions on Algorithms10.1145/318699114:3(1-8)Online publication date: 16-Jun-2018
https://dl.acm.org/doi/10.1145/3186991
Fukunaga T(2017)Spider Covers for Prize-Collecting Network Activation ProblemACM Transactions on Algorithms10.1145/313274213:4(1-31)Online publication date: 25-Oct-2017
https://dl.acm.org/doi/10.1145/3132742
Fukunaga TIndyk P(2015)Spider covers for prize-collecting network activation problemProceedings of the twenty-sixth annual ACM-SIAM symposium on Discrete algorithms10.5555/2722129.2722131(9-24)Online publication date: 4-Jan-2015
https://dl.acm.org/doi/10.5555/2722129.2722131

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