The time-varying shortest path problem with fuzzy transit costs and speedup

[1] X. Cai X, D. Sha, C. K. Wong, Time-varying network optimization, Springer Science Press. New York, USA, 2007.Search in Google Scholar

[2] L. Campos, J. L. Verdegay, Linear programming problems and ranking of fuzzy numbers, Fuzzy Sets and Systems, 32 (1989), 1–11.10.1016/0165-0114(89)90084-5Search in Google Scholar

[3] M. Gent, R. Cheng, D. Wang, Genetic algorithms for solving shortest path problems, Proceedings of the IEEE International Conference on Evolutionary Computation, (1997), 401–406.Search in Google Scholar

[4] X. Ji, K. Iwamura, Z. Shao, New models for shortest path problem with problem with fuzzy arc lengths, Applied Mathematical Modeling, 31 (2007), 259–269.10.1016/j.apm.2005.09.001Search in Google Scholar

[5] A. Kaufmann, M. M. Gupta, Fuzzy mathematical models in engineering and management science, Elsevier, Amsterdam, The Netherland, 1988.Search in Google Scholar

[6] A. Kaur, A. Kumar, A new approach for solving fuzzy transportation problems using generalized trapezoidal fuzzy numbers, Applied Soft Computing, 12 (2012), 1201–1213.10.1016/j.asoc.2011.10.014Search in Google Scholar

[7] C. M. Klein, Fuzzy shortest path, Fuzzy Sets and Systems, 39 (1991), 27–41.10.1016/0165-0114(91)90063-VSearch in Google Scholar

[8] A. Kumar, K. Manjot, A new algorithm for solving network ow problems with fuzzy arc lengths, Turkish Journal of Fuzzy Systems, 1 (2011), 1–13.Search in Google Scholar

[9] Y. Li, M. Gen, K. Ida, Solving fuzzy shortest path problems by neural networks, Computers and Industrial Engineering, 31 (1996), 861–865.10.1016/S0360-8352(96)00278-1Search in Google Scholar

[10] K. C. Lin, M. S. Chern, The fuzzy shortest path problem and its most vital arcs, Fuzzy Sets and Systems, 58 (1993), 343–353.10.1016/0165-0114(93)90508-FSearch in Google Scholar

[11] I. Mahdavi, R. Nourifar, A. Heidarzade, N. M. Amiri, A dynamic programming approach for finding shortest chains in fuzzy network, Applied Soft Computing, 9 (2009), 503–511.10.1016/j.asoc.2008.07.002Search in Google Scholar

[12] S. Moazeni, Fuzzy shortest path problem with finite fuzzy quantities, Applied Mathematics and Computation, 183 (2006), 160–169.10.1016/j.amc.2006.05.067Search in Google Scholar

[13] S. Okada, M. Gen, Fuzzy shortest path problems, Computers and Industrial Engineering, 27 (1994), 465–468.10.1016/0360-8352(94)90335-2Search in Google Scholar

[14] S. Okada, T. Soper, A shortest path problem on a network with fuzzy arc lengths, Fuzzy Sets and Systems, 109 (2000), 129–140.10.1016/S0165-0114(98)00054-2Search in Google Scholar

[15] Gh. Shirdel, H. Rezapour, K-Objective Time-Varying Shortest Path Problem with Zero Waiting Times at Vertices, Trends in Applied Science Research, 5 (2015), 278–285.10.3923/tasr.2015.278.285Search in Google Scholar