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International Journal of Management Science and Engineering Management Volume 12, 2017 - Issue 2
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Articles

An application of possibilistic programming to production sequencing of mining parcels

Mustafa KumralDepartment of Mining and Materials Engineering, McGill University, 3450 University St, Montreal, CanadaCorrespondence[email protected]
&
Yuksel Asli SariDepartment of Mining and Materials Engineering, McGill University, 3450 University St, Montreal, Canada
Pages 79-88 | Received 14 Oct 2015, Accepted 23 Feb 2016, Published online: 14 Apr 2016

References

  • Askari-Nasab, H., Pourrahimian, Y., Ben-Awuah, E., & Kalantari, S. (2011). Mixed integer linear programming formulations for open pit production scheduling. Journal of Mining Science, 47, 338–359.10.1134/S1062739147030117
  • Bastante, F. G., Taboada, J., & Ordóñez, C. (2004). Design and planning for slate mining using optimisation algorithms. Engineering Geology, 73, 93–103.10.1016/j.enggeo.2003.12.002
  • Bellman, R. (1956). Dynamic programming and Lagrange multipliers. Proceedings of the National Academy of Sciences of the United States of America, 42, 767–769. 10.1073/pnas.42.10.767
  • Boland, N., Fricke, C., & Froyland, G. (2007). A strengthened formulation for the open pit mine production scheduling problem. Retrieved November 15, 2007, from http://www.optimization–online.org/DB_FILE/2007/03/1624.pdf.
  • Boland, N., Dumitrascu, I., Froyland, G., & Gleixner, A. (2009). LP–based disaggregation approaches to solving the open pit mining production scheduling problem with block processing selectivity. Computers and Operations Research, 36, 1064–1089.10.1016/j.cor.2007.12.006
  • Bley, A., Boland, N., Fricke, C., & Froyland, G. (2010). A strengthened formulation and cutting planes for the open pit mine production scheduling problem. Computers & Operations Research, 37, 1641–1647.
  • Caccetta, L., & Hill, S. P. (2003). An application of branch and cut to open pit mine scheduling. Journal of Global Optimization, 27, 349–365.10.1023/A:1024835022186
  • Carlson, T. R., Erickson, J. D., O’Brian, D. T., & Pana, M. T. (1966). Computer techniques in mine planning. Mining Engineering, 18, 53–56.
  • Chanas, S. (1983). The use of parametric programming in fuzzy linear programming. Fuzzy Sets and Systems, 11, 243–251.10.1016/S0165-0114(83)80083-9
  • Choudhury, S., & Chatterjee, S. (2014). Pit optimisation and life of mine scheduling for a tenement in the Central African Copperbelt. International Journal of Mining, Reclamation and Environment, 28, 200–213.10.1080/17480930.2013.811802
  • Denby, B., & Schofield, D. (1994). Open–pit design and scheduling by use of genetic algorithms. Transactions of the Institution of Mining and Metallurgy. Section A. Mining Industry, 103.
  • Deutsch, C., & Journel, A. (1992). GSLIB: Geostatistical Software Library and User’s Guide. New York: Oxford University Press.
  • Erdem, Ö., Güyagüler, T., & Demirel, N. (2012). Uncertainty assessment for the evaluation of net present value: A mining industry perspective. Journal of the Southern African Institute of Mining and Metallurgy, 112, 405–412.
  • Espinoza, D., Goycoolea, M., Moreno, E., & Newman, A. (2013). MineLib: A library of open pit mining problems. Annals of Operations Research, 206, 93–114.10.1007/s10479-012-1258-3
  • Fourer, R., Gay, D. M., & Kernighan, B. W. (1993). AMPL. Danvers, MA: Boyd & Fraser.
  • Gershon, M. E. (1983). Optimal mine production scheduling: Evaluation of large scale mathematical programming approaches. International Journal of Mining Engineering, 1, 315–329.10.1007/BF00881548
  • Gershon, M. E. (1987). An open–pit production scheduler: Algorithm and implementation. Mining Engineering, 39(8), 793–795.
  • Groeneveld, B., & Topal, E. (2011). Flexible open-pit mine design under uncertainty. Journal of Mining Science, 47, 212–226.10.1134/S1062739147020080
  • Helgeson, W. B., & Birnie, D. P. (1961). Assembly line balancing using the ranked positional weight technique. Journal of Industrial Engineering, 12, 394–398.
  • Hochbaum, D. S. (2001). A new-old algorithm for minimum-cut and maximum-flow in closure graphs. Networks: An International Journal, 37, 171–193.10.1002/(ISSN)1097-0037
  • Hwang, C. L., & Yoon, K. (1981). Multiple attribute decision making. Berlin: Springer-Verlag.
  • Inuiguchi, M., Sakawa, M., & Kume, Y. (1994). The usefulness of possibilistic programming in production planning problems. International Journal of Production Economics, 33, 45–52.10.1016/0925-5273(94)90117-1
  • Jiménez, M., Arenas, M., Bilbao, A., & Rodrı, M. V. (2007). Linear programming with fuzzy parameters: An interactive method resolution. European Journal of Operational Research, 177, 1599–1609.10.1016/j.ejor.2005.10.002
  • Journel, A., & Isaaks, E. (1984). Conditional indicator simulations: Application to a Saskatchewan uranium deposit. Mathematical Geology, 167, 685–718.10.1007/BF01033030
  • Julien, B. (1994). An extension to possibilistic linear programming. Fuzzy Sets and Systems, 64, 195–206.10.1016/0165-0114(94)90333-6
  • Khalokakaie, R. (1999). Computer-aided optimal open pit design with variable slope angles ( PhD Thesis). U of Leeds.
  • Kataoka, S. (1963). A stochastic programming model. Econometrica: Journal of the Econometric Society, 31, 181–196.10.2307/1910956
  • Koenigsberg, E. (1982). The optimum contours of an open pit mine: An application of dynamic programming. 17th Application of Computers and Operations Research in the Mineral Industry, 274–287.
  • Korobov, S. (1974). Method for determining optimal open pit limits. Technical report no: EP74-R-4, Ecole Polytechnique de Montreal, 24 p.
  • Kumral, M. (2010). Robust stochastic mine production scheduling. Engineering Optimization, 42, 567–579.10.1080/03052150903353336
  • Kumral, M. (2011). Incorporating geo–metallurgical information into mine production scheduling. Journal of the Operational Research Society, 62, 60–68.10.1057/jors.2009.174
  • Kumral, M. (2013). Optimizing ore–waste discrimination and block sequencing through simulated annealing. Applied Soft Computing, 13, 3737–3744.10.1016/j.asoc.2013.03.005
  • Lai, Y. J., & Hwang, C. L. (1992). A new approach to some possiblistic linear programming problems. Fuzzy Sets and Systems, 49, 121–133.10.1016/0165-0114(92)90318-X
  • Lerchs, H., & Grossman, I. F. (1965). Optimum Design of Open-Pit Mines. CIM Transactions, 58, 47–54.
  • Li, Y., Topal, E., & Williams, D. J. (2014). Optimisation of waste rock placement using mixed integer programming. Mining Technology, 123, 220–229.10.1179/1743286314Y.0000000070
  • Liang, T. F. (2007). Application of interactive possibilistic linear programming to aggregate production planning with multiple imprecise objectives. Production Planning & Control, 18, 548–560.
  • Lu, J., Wu, F., & Zhang, G. (2007). On a generalized fuzzy goal optimization for solving fuzzy multi–objective linear programming problems. Journal of Intelligent and Fuzzy Systems, 18, 83–97.
  • Mezghani, M., Loukil, T., & Aouni, B. (2012). Aggregate planning through the imprecise goal programming model: Integration of the manager’s preferences. International Transactions in Operational Research, 19, 581–597.10.1111/j.1475-3995.2012.00844.x
  • Onur, A. H., & Dowd, P. (1993). Open–pit optimization– Part 2: Production scheduling and inclusion of roadways. Transaction of Institute of Mining Metallurgy (Sect A Mining Industry), 102, 105–113.
  • Pannier, S., & Graf, W. (2012). Simulation-driven sequential metamodels for fuzzy reliability-based optimisation tasks. International Journal of Mathematical Modelling and Numerical Optimisation, 3, 30–44.10.1504/IJMMNO.2012.044712
  • Ramazan, S., & Dagdelen, K. (2005). Fundamental tree algorithm in optimising production scheduling for open pit mine design. Mining Technology: IMM Transactions (Section A), 114, 45–54.10.1179/037178405X44511
  • Razmi, J., Hassani, A., & Babazadeh, R. (2015). A hybrid fuzzy bi-objective delivery planning model for leagile e-tailing under uncertainty. International Journal of Management Science and Engineering Management, 10, 62–72.10.1080/17509653.2014.962110
  • Rommelfanger, H. (1996). Fuzzy linear optimization and applications. European Journal of Operational Research, 92, 512–527.10.1016/0377-2217(95)00008-9
  • Sahoo, P. K., & Pattnaik, M. (2014). A managerial decision-making approach to fuzzy linear programming problems. International Journal of Management Science and Engineering Management, 9, 185–190.10.1080/17509653.2013.858415
  • Sasikumar, K., & Mujumdar, P. P. (1998). Fuzzy optimization model for water quality management of a river system. Journal of Water Resources Planning and Management, 124, 79–88.10.1061/(ASCE)0733-9496(1998)124:2(79)
  • Sattarvand, J., & Niemann-Delius, C. (2008). Perspective of metaheuristic optimization methods in open pit production planning. Gospodarka Surowcami Mineralnymi, 24, 143–156.
  • Shishvan, M. S., & Sattarvand, J. (2015). Long term production planning of open pit mines by ant colony optimization. European Journal of Operational Research, 240, 825–836.10.1016/j.ejor.2014.07.040
  • Tanaka, H., & Asai, K. (1984). Fuzzy linear programming with fuzzy parameters. Fuzzy Sets and Systems, 13, 1–10.10.1016/0165-0114(84)90022-8
  • Tolwinski, B., & Underwood, R. (1996). A scheduling algorithm for open pit mines. IMA Journal of Mathematics Applied in Business and Industry, 7, 247–270.
  • Torabi, S. A., & Hassini, E. (2008). An interactive possibilistic programming approach for multiple objective supply chain master planning. Fuzzy Sets and Systems, 159, 193–214.10.1016/j.fss.2007.08.010
  • Wang, H., Kochenberger, G., & Xu, Y. (2010). A note on optimal solutions to quadratic knapsack problems. International Journal of Mathematical Modelling and Numerical Optimisation, 1, 344–351.10.1504/IJMMNO.2010.035431
  • Wang, R. C., & Fang, H. H. (2001). Aggregate production planning with multiple objectives in a fuzzy environment. European Journal of Operational Research, 133, 521–536.10.1016/S0377-2217(00)00196-X
  • Wang, R. C., & Liang, T. F. (2005). Applying possibilistic linear programming to aggregate production planning. International Journal of Production Economics, 98, 328–341.10.1016/j.ijpe.2004.09.011
  • Wang, Q., Xu, X. C., & Gu, X. W. (2013). A Dynamic-Programming Based Model for Phase-Mining Optimization in Open-Pit Metal Mines. Applied Mechanics and Materials, 316, 896–901.
  • Weintraub, A., Pereira, M., & Schultz, X. (2008). A priori and a posteriori aggregation procedures to reduce model size in MIP mine planning models. Electronic Notes in Discrete Mathematics, 30, 297–302.10.1016/j.endm.2008.01.051
  • Zadeh, L. (1978). Fuzzy sets as a basis for a theory of possibility. Fuzzy Sets and Systems, 1, 3–28.10.1016/0165-0114(78)90029-5
  • Zhao, Y., & Kim, A. (1992). A new optimum pit limit design algorithm. In V. Ramani (Ed.), 23rd APCOM Symposium (Application of Computers and Operations Research in the Mineral Industry) Proceedings (pp. 500–506). Littleton: SME/AIME Publication.
  • Zimmermann, H. J. (1978). Fuzzy programming and linear programming with several objective functions. Fuzzy Sets and Systems, 1, 45–55.10.1016/0165-0114(78)90031-3

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