×

zbMATH — the first resource for mathematics

An efficient algorithm for the location-allocation problem with rectangular regions. (English) Zbl 0462.90029

MSC:
90B05 Inventory, storage, reservoirs
90C90 Applications of mathematical programming
90C09 Boolean programming
65K05 Numerical mathematical programming methods
PDF BibTeX XML Cite
Full Text: DOI
References:
[1] ”Probabilistic Formulation of Some Facility Location Problems,” unpublished Ph.D. dissertation, Virginia Polytechnic Institute, Blacksburg, Va. (1975).
[2] Aly, Naval Research Logistics Quarterly 25 pp 531– (1978)
[3] and , ”Multifacility Location Problem Among Rectangular Regions,” Working paper, School of Industrial Engineering, University of Oklahoma, Norman, Okla. (1978).
[4] Bellman, SIAM Review 7 pp 126– (1965)
[5] Cooper, Operations Research 11 pp 331– (1963)
[6] Cooper, SIAM Review 6 pp 37– (1964)
[7] Cooper, Journal of Regional Science 7 pp 1– (1967)
[8] Katz, SIAM Journal of Numerical Analysis 17 pp 683– (1974)
[9] Kuenne, Mathematical Programming 3 pp 193– (1972)
[10] Leamer, Journal of Regional Science 8 pp 229– (1968)
[11] Love, Naval Research Logistics Quarterly 22 pp 441– (1975)
[12] Ostresh, Journal of Regional Science 15 pp 209– (1975)
[13] and , eds., Computer Programs for Location-Allocation Problems, Monograph No. 6, Department of Geography, University of Iowa, Iowa City, Ia. (1973).
[14] Sherali, AIIE Transactions 9 pp 136– (1977) · doi:10.1080/05695557708975135
[15] Wendell, Operations Research 21 pp 314– (1973)
[16] Wesolowsky, Naval Research Logistics Quarterly 18 pp 83– (1971)
[17] Wesolowsky, Journal of Regional Science 17 pp 53– (1977)
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.