Abstract
We revisit the problem of finding k paths with a minimum number of shared edges between two vertices of a graph. An edge is called shared if it is used in more than one of the k paths. We provide a [k/2]-approximation algorithm for this problem, improving the best previous approximation factor of k − 1. We also provide the first approximation algorithm for the problem with a sublinear approximation factor of O(n 3/4), where n is the number of vertices in the input graph. For sparse graphs, such as bounded-degree and planar graphs, we show that the approximation factor of our algorithm can be improved to \(O(\sqrt{n})\). While the problem is NP-hard, and even hard to approximate to within an O(logn) factor, we show that the problem is polynomially solvable when k is a constant. This settles an open problem posed by Omran et al. regarding the complexity of the problem for small values of k. We present most of our results in a more general form where each edge of the graph has a sharing cost and a sharing capacity, and there is vulnerability parameter r that determines the number of times an edge can be used among different paths before it is counted as a shared/vulnerable edge.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
Carr, R.D., Fleischer, L.K., Leung, V.J., Phillips, C.A.: Strengthening integrality gaps for capacitated network design and covering problems. In: Proc. 11th ACM-SIAM Sympos. Discrete Algorithms, pp. 106–115 (2000)
Even, G., Kortsarz, G., Slany, W.: On network design problems: fixed cost flows and the covering steiner problem. ACM Trans. Algorithms 1(1), 74–101 (2005)
Franklin, M.K.: Complexity and security of distributed protocols. PhD thesis, Dept. of Computer Science, Columbia University (1994)
Garey, M., Johnson, D.S.: Computers and intractability: A guide to the theory of NP-completeness. W.H. Freeman (1979)
Garg, N., Ravi, R., Konjevod, G.: A polylogarithmic approximation algorithm for the group Steiner tree problem. J. Algorithms 37(1) (2000)
Goldberg, A.V., Rao, S.: Beyond the flow decomposition barrier. J. ACM 45(5), 783–797 (1998)
Goldberg, A.V., Tarjan, R.E.: A new approach to the maximum-flow problem. J. ACM 35(4), 921–940 (1988)
Konjevod, G., Ravi, R., Srinivasan, A.: Approximation algorithms for the covering steiner problem. Random Structures & Algorithms 20(3), 465–482 (2002)
Krumke, S.O., Noltemeier, H., Schwarz, S., Wirth, H.-C., Ravi, R.: Flow improvement and network flows with fixed costs. In: Proc. Internat. Conf. Oper. Res.: OR 1998, pp. 158–167 (1998)
Omran, M.T., Sack, J.-R., Zarrabi-Zadeh, H.: Finding Paths with Minimum Shared Edges. In: Fu, B., Du, D.-Z. (eds.) COCOON 2011. LNCS, vol. 6842, pp. 567–578. Springer, Heidelberg (2011)
Wang, J., Yang, M., Yang, B., Zheng, S.Q.: Dual-homing based scalable partial multicast protection. IEEE Trans. Comput. 55(9), 1130–1141 (2006)
Williamson, D.P., Shmoys, D.B.: The design of approximation algorithms. Cambridge University Press (2011)
Yang, B., Yang, M., Wang, J., Zheng, S.Q.: Minimum cost paths subject to minimum vulnerability for reliable communications. In: Proc. 8th Internat. Symp. Parallel Architectures, Algorithms and Networks, ISPAN 2005, pp. 334–339. IEEE Computer Society (2005)
Zheng, S.Q., Wang, J., Yang, B., Yang, M.: Minimum-cost multiple paths subject to minimum link and node sharing in a network. IEEE/ACM Trans. Networking 18(5), 1436–1449 (2010)
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2012 Springer-Verlag Berlin Heidelberg
About this paper
Cite this paper
Assadi, S., Emamjomeh-Zadeh, E., Norouzi-Fard, A., Yazdanbod, S., Zarrabi-Zadeh, H. (2012). The Minimum Vulnerability Problem. In: Chao, KM., Hsu, Ts., Lee, DT. (eds) Algorithms and Computation. ISAAC 2012. Lecture Notes in Computer Science, vol 7676. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-35261-4_41
Download citation
DOI: https://doi.org/10.1007/978-3-642-35261-4_41
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-642-35260-7
Online ISBN: 978-3-642-35261-4
eBook Packages: Computer ScienceComputer Science (R0)