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The alternating basis algorithm for assignment problems. (English) Zbl 0378.90097


MSC:

90C35 Programming involving graphs or networks
90C10 Integer programming
65K05 Numerical mathematical programming methods
90C05 Linear programming

Software:

NETGEN
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Full Text: DOI

References:

[1] R.S. Barr, ”Streamlining primal simplex transportation codes”, Research Rep., Center for Cybernetic Studies, University of Texas, Austin, TX, to appear.
[2] R.S. Barr, F. Glover and D. Klingman, ”Enhancements to spanning tree labeling procedures for network optimization”, Rep. 262, Center for Cybernetic Studies, University of Texas, Austin, TX. · Zbl 0403.90083
[3] R.S. Barr, F. Glover and D. Klingman, ”An improved version of the out-of-kilter method and a comparative study of computer codes”,Mathematical Programming 7 (1) (1974) 60–87. · Zbl 0313.90044
[4] G. Bradley, G. Brown and G. Graves, ”A comparison of storage structure for primal network codes”, presented at ORSA/TIMS conference, Chicago, April 1975.
[5] G. Bradley, G. Brown and G. Graves, ”Tailoring primal network codes to classes of problems with common structure”, ORSA/TIMS conference, Las Vegas (1975).
[6] W.H. Cunningham, ”A network simplex method”, Tech. Rep. No. 207, Dept. of Mathematical Sciences, Johns Hopkins University (1974). · Zbl 0352.90039
[7] F. Glover and D. Klingman, ”Locating stepping-stone paths in distribution problems via the predecessor index method”,Transportation Science 4 (1970) 220–226.
[8] F. Glover, D. Karney and D. Klingman, ”Implementation and computational study on start procedures and basis change criteria for a primal network code”,Networks 4 (3) (1974) 191–212. · Zbl 0282.68020
[9] F. Glover, D. Karney and D. Klingman, ”Augmented predecessor index method for location stepping stone paths and assigning dual prices in distribution problems”,Transportation Science 6 (1) (1972) 171–181.
[10] F. Glover, D. Karney, D. Klingman and A. Napier, ”A computational study on start procedures, basis change criteria, and solution algorithms for transportation problems”,Management Science 20 (5) (1974) 793–819. · Zbl 0303.90039
[11] F. Glover and D. Klingman, ”Improved labeling of L.P. bases in networks”, Research Report CS 218, Center for Cybernetic Studies, University of Texas, Austin, TX (1974).
[12] F. Glover, D. Klingman and J. Stutz, ”Augmented threaded method”,Canadian Journal of Operational Research and Information Processing 12 (3) (1974) 293–298. · Zbl 0288.90077
[13] R.S. Hatch, ”Optimization strategies for large scale assignment and transportation type problems”, ORSA/TIMS conference, San Juan, Puerto Rico (1974).
[14] D. Klingman, A. Napier and J. Stutz, ”NETGEN-A program for generating large scale (un)capacitated assignment, transportation, and minimum cost flow network problems”,Management Science 20 (5) (1974) 814–822. · Zbl 0303.90042
[15] J. Mulvey, ”Column weighting factors and other enhancements to the augmented threaded index method for network optimization”, Joint ORSA/TIMS conference, San Juan, Puerto Rico (1974).
[16] V. Srinivasan and G.L. Thompson, ”Benefit-cost analysis of coding techniques for the primal transportation algorithm”,Journal of the Association of Computing Machines 20 (1973) 194–213. · Zbl 0257.68034
[17] V. Srinivasan and G.L. Thompson, ”Accelerated algorithms for labeling and relabeling of trees with application for distribution problems”,Journal of the Association of Computing Machines 19 (4) (1972) 712–726. · Zbl 0255.90071
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