Abstract
In this paper we consider the problems of computing a minimum co-cycle basis and a minimum weakly fundamental co-cycle basis of a directed graph G. A co-cycle in G corresponds to a vertex partition (S,V ∖ S) and a { − 1,0,1} edge incidence vector is associated with each co-cycle. The vector space over ℚ generated by these vectors is the co-cycle space of G. Alternately, the co-cycle space is the orthogonal complement of the cycle space of G. The minimum co-cycle basis problem asks for a set of co-cycles that span the co-cycle space of G and whose sum of weights is minimum. Weakly fundamental co-cycle bases are a special class of co-cycle bases, these form a natural superclass of strictly fundamental co-cycle bases and it is known that computing a minimum weight strictly fundamental co-cycle basis is NP-hard. We show that the co-cycle basis corresponding to the cuts of a Gomory-Hu tree of the underlying undirected graph of G is a minimum co-cycle basis of G and it is also weakly fundamental.
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References
Berger, F., Gritzmann, P., de Vries, S.: Minimum Cycle Bases for Network Graphs. Algorithmica 40(1), 51–62 (2004)
Bunke, F., Hamacher, H.W., Maffioli, F., Schwahn, A.M.: Minimum cut bases in undirected networks Report in Wirtschaftsmathematik 56, Fachbereich Mathematik, TU Kaiserslautern (2007)
de Pina, J.C.: Applications of Shortest Path Methods. PhD thesis, University of Amsterdam, Netherlands (1995)
Elkin, M., Liebchen, C., Rizzi, R.: New length bounds for cycle bases. Information Processing Letters, 104(5): 186-193 (2007)
Goldberg, A.V., Rao, S.: Beyond the flow decomposition barrier. Journal of the ACM, 45(5): 783-797 (1998)
Golynski, A., Horton, J.D.: A polynomial time algorithm to find the minimum cycle basis of a regular matroid. In: Penttonen, M., Schmidt, E.M. (eds.) SWAT 2002. LNCS, vol. 2368, pp. 200–209. Springer, Heidelberg (2002)
Gomory, R., Hu, T.C.: Multi-terminal network flows. SIAM Journal on Computing 9, 551–570 (1961)
Gusfield, D.: Very simple methods for all pairs network flow analysis. SIAM Journal on Computing 19(1), 143–155 (1990)
Hariharan, R., Kavitha, T., Mehlhorn, K.: A Faster Deterministic Algorithm for Minimum Cycle Bases in Directed Graphs. In: Bugliesi, M., Preneel, B., Sassone, V., Wegener, I. (eds.) ICALP 2006. LNCS, vol. 4051, pp. 273–284. Springer, Heidelberg (2006)
Horton, J.D.: A polynomial-time algorithm to find a shortest cycle basis of a graph. SIAM Journal on Computing 16, 359–366 (1987)
Kavitha, T.: An \(\tilde{O}(m^2n)\) Randomized Algorithm to compute a Minimum Cycle Basis of a Directed Graph. In: Caires, L., Italiano, G.F., Monteiro, L., Palamidessi, C., Yung, M. (eds.) ICALP 2005. LNCS, vol. 3580, pp. 273–284. Springer, Heidelberg (2005)
Kavitha, T., Mehlhorn, K.: Algorithms to compute Minimum Cycle Bases in Directed Graphs. Theory of Computing Systems 40, 485–505 (2007)
Kavitha, T., Mehlhorn, K., Michail, D., Paluch, K.: A faster algorithm for Minimum Cycle Bases of graphs. In: Díaz, J., Karhumäki, J., Lepistö, A., Sannella, D. (eds.) ICALP 2004. LNCS, vol. 3142, pp. 846–857. Springer, Heidelberg (2004)
Leydold, J., Stadler, P.F.: Minimum cycle bases of outerplanar graphs. Electronic Journal of Combinatorics 5 (1998)
Liebchen, C.: Finding Short Integral Cycle Bases for Cyclic Timetabling. In: Di Battista, G., Zwick, U. (eds.) ESA 2003. LNCS, vol. 2832, pp. 715–726. Springer, Heidelberg (2003)
Liebchen, C., Peeters, L.: On Cyclic Timetabling and Cycles in Graphs. Technical Report 761/2002, TU Berlin (2002)
Liebchen, C., Rizzi, R.: A Greedy Approach to compute a Minimum Cycle Basis of a Directed Graph. Information Processing Letters 94(3), 107–112 (2005)
Liebchen, C., Rizzi, R.: Classes of Cycle Bases. Discrete Applied Mathematics 155(3), 337–355 (2007)
Rizzi, R.: Minimum Weakly Fundamental Cycle Bases are hard to find. Algorithmica (published online October 2007)
Schrijver, A.: Theory of Linear and Integer Programming, 2nd edn. Wiley, Chichester (1998)
Whitney, H.: On the abstract properties of linear dependence. American Journal of Mathematics 57, 509–533 (1935)
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Kavitha, T. (2008). On a Special Co-cycle Basis of Graphs. In: Gudmundsson, J. (eds) Algorithm Theory – SWAT 2008. SWAT 2008. Lecture Notes in Computer Science, vol 5124. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-540-69903-3_31
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DOI: https://doi.org/10.1007/978-3-540-69903-3_31
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