___

• Baker, K. R., Introduction to Sequencing and Scheduling, John Wiley and Sons, New York, 1974.
• Baker, K. R., and Schrage, L. E., “Finding an Optimal Sequencing by Dynamic Programming: An Extension to Precedence-Related Tasks”, Operations Research, Volume 26, No: 1, 1978.
• Gupta, S., and Kyparisis, J., “Single Machine Scheduling Research”, OMEGA International Journal of Management Science, Volume 15, No: 3, pp. 207-227, 1987.
• Dileepan, P., and Sen, T., “Bicriterion Static Scheduling Research For A Single Machine”, OMEGA International Journal of Management Science, Volume 16, No: 1, pp. 53-59, 1988.
• Van Wassenhove, L. N., and Gelders, F., “Solving A Bicriterion Scheduling Problem”, European Journal of Operational Research, Volume 4, No: 1, pp. 42-48, 1980.
• Cheun, C., and Bulfin, R.L., “Scheduling Unit Processing Time Jobs on a Single Machine with Multiple Criteria”, Computers and Operations Research, Volume 17, No: 1, pp. 1-7, 1990.
• Dileepan, P., and Sen, T., “Bicriteria Scheduling with Total Flowtime and Sum of Squared Lateness”, Engineering Cost and Production Economics, Volume 21, No: 8, pp. 295-299, 1991.
• Sen, T., and Gupta, S. K., “A Branch and Bound to Solve a Bicriterion Scheduling Problem”, IEE Transactions, Volume 15, pp. 84-88, 1983.
• Sen, T., Raiszadeh, F. M. E., and Dileepan, P., “A Branch-and-Bound Approach to The Bicriterion Scheduling Problem Involving Total Flowtime and Range of Lateness”, Management Science, Volume 34, No: 2, pp. 255-260, 1988.
• Fry, T. D., Armstrong, R. D., and Lewis, H., “A Framework for Single Machine Multiple Objective Sequencing Research”, OMEGA, Volume 17, No: 6, pp. 595-607, 1989.
• Nagar, A., Hadddock, J., and Heragu, S., “Multiple and Bicriteria Scheduling: A Literature Survey”, European Journal of Operational Research, Volume 81, pp. 88-104, 1995.
• T’kint, V., and Billaut J.-C., “Multicriteria Scheduling Problems: A Survey”, RAIRO Operations Research, Volume 35, pp. 143-163, 2001.
• Van Wassenhove, L. N., and Gelders, F., “Four Solution Techniques for a General One Machine Scheduling Problem: A Comparative Study”, European Journal of Operational Research, Volume 2, No: 4, pp. 281-290, 1978.
• John, T. C., “Trade off Solution in Single Machine Production Scheduling for Minimizing Flowtime and Maximum Penalty”, Computers and Operations Research, Volume 16, No: 5, pp. 471-479, 1989.
• Morton, T. E., Pentico, D. W., Heuristic Scheduling Systems, Wiley, New York, 1993.
• Pinedo, M. L., Scheduling: Theory, Algorithms, and Systems, Prentice-Hall, Englewood, 1995.
• Pinedo, M. L., and Chao, X., Operations Scheduling with Applications in Manufacturing and Services, Irwin McGraw-Hill, Singapore, 1999.
• Baker, K. R., Elementes of Sequencing and Scheduling, Dartmouth College, Hanover, 1997.
• Kirkpatrick, S., Gelatt, C. D., and. Vecchi, M. P., “Optimization by Simulated Annealing”, Science, Volume 220, pp. 671–680, 1983.
• Glover, F., and Laguna, M., Tabu Search, Kluwer Academic Publishers, United Stated of America, 1997.
• Glover, F., "Future Paths For Integer Programming and Links to Artificial Intelligence", Computers and Operations Research, Volume 13, No: 5, pp. 533-549, 1986.
• Glover, F., "Tabu Search - Part I", ORSA Journal on Computing, Volume 1, No: 3, pp. 190-206, 1989.
• Glover, F., "Tabu Search - Part II", ORSA Journal on Computing, Volume 2, No: 1, pp .4-32, 1990.
• Goldberg, D. E., Genetic Algorithms in Search, Optimization and Machine Learning, Addison-Wesley, Reading, M. A, 1989.
• Jones, D. F., Mirrazavi, S. K., and Tamiz, M., “Multi-Objective Meta-Heuristics: An Overview of The Current State-of-The-Art”, European Journal of Operational Research, Volume 137, No: 1, pp. 1-9, 2002.
• Kan, A. H. G., Machine Scheduling Problems, Martinus Nijhoff, The Hague, 1976.
• Lenstra, J. K., Sequencing by Enumerative Method, Second Printing, Mathemtisch Centrum, 1985.
• Cheun, C.-L., and Bulfin, R. L., “Complexity of Single Machine Multi-criteria Scheduling Problems”, European Journal of Operational Research, Volume 70, pp. 115-125, 1993.
• Blazewicz, J., Ecker, K., Schmidt, G., and Weglarz, J., Scheduling in Computer and Manufacturing Systems, Springer, Berlin, 1993.
• Tanaev, V. S., Gordon, V. S., and Shafransky, Y. M., Scheduling Theory: Single-Stage Systems, Kluwer, Dordrecht, 1994.
• Tanaev, V. S., Sotskov, Y. N., and Strusevich, V. A., Scheduling Theory: Multi-Stage Systems, Kluwer, Dordrecht, 1994.
• Chretienne, P., Co Man, Jr., E. G., Lenstra, J. K., Liu, Z., Scheduling Theory and Its Applications, Wiley, Chichester, 1995.
• Blazewicz, J., Ecker, K., Pesch, E., Schmidt, G., Weglarz, J., Scheduling Computer and Manufacturing Processes, Springer, Berlin, 1996.
• Sen, T., Gupta, S. K., “A State-of-Art Survey of Static Scheduling Research Involving Due Dates”, OMEGA, Volume 12, pp. 63–76, 1984.
• Raghavachari, M., “Scheduling Problem with Non-Regular Penalty Functions-A Review”, Opsearch, Volume 25, No: 3, pp. 144-164, 1988.
• Kawaguchi, T., and Kyan, S., “Deterministic Scheduling in Computer Systems: A Survey”, Journal of The Operational Research Society of Japan, Volume 31, pp. 190–217, 1988.
• Baker, K. R., and Scudder, G. D., “Sequencing with Earliness and Tardiness Penalties: A Review”, Operations Research, Volume 38, No: 1, pp. 22-36, 1990.
• Cheng, T. C. E., Gupta, M. C., “Survey of Scheduling Research Involving Due Date Determination Decisions”, European Journal of Operational Research, Volume 38, pp. 156–166, 1989.
• Cheng, T. C. E., Sin, C. C. S., “A State-of-The-Art Review of Parallel-Machine Scheduling Research”, European Journal of Operational Research, Volume 47, pp. 271–292, 1990.
• Lawler, E. L., Lenstra, J. K., Rinnooy Kan, A. H. G., Shmoys, D. B., Sequencing and Scheduling: Algorithms and Complexity, In: Graves S.C., Zipkin P.H., Rinnooy, 1993.
• Koulamas, C., “The Total Tardiness Problem: Review and Extensions”, Operations Research, Volume 42, pp. 1025–1041, 1994.
• Hoogeveen, J. A., Van de Velde, S. L., “Earliness–Tardiness Scheduling Around Almost Equal Due Date”, INFORMS Journal on Computing, Volume 9, pp. 92–99, 1997.
• Gordon, V., Proth, J.-M., and Chu, C., “A Survey of The State-of-The-Art of Common Due Date Assignment and Scheduling Research”, European Journal of Operational Research, Volume 139, pp. 1-25, 2002.
• Lung, C. C., Multicriteria Scheduling For A Single Machine: Analysis and Algorithms, Ph.D., Auborn University, 1989.
• Graham, R. L., Lawler, E. L., and Rinnooy Kan, A. H. G., “Optimization and Approximation in Deterministic Sequencing and Scheduling”, Annals of Discrete Mathematics, Volume 5, pp. 287-326, 1979.
• Evans, G. W., “An Owerview of Techniques For Solving Multi-Objective Mathematical Programs”, Management Science, Volume 30, No: 11, pp. 1268-1283, 1984.
• De, P., Grosh, J. B., and Wells C. E., “Some Clarifications on the Bicriteria Scheduling of Unit Execution Time Jobs on a Single Machine”, Computers and Operations Research, Volume 18, No: 8, pp. 717-720, 1991.
• Smith, W. E., “Varios Optimizers for Single-Stage Production”, Naval Research Logistics Quarterly, Volume 3, pp. 59-66, 1956.
• Jackson, J. R., Scheduling a Production Line To Minimize Maksimum Tardiness, Research Report, University of California at Los Angeles, 1965.
• Heck, H., and Roberts, S., “A Note on The Extension of a Result on Scheduling with Secondary Criteria”, Naval Research Logistics Quarterly, Volume 19, pp. 403-405, 1972.
• Van Wassenhove, L. N., and Baker, K. R., “A Bicriterion Approach to Time Cost Trade-Offs in Sequencing”, European Journal of Operational Research, Volume 11, pp. 48-54, 1982.
• Townsend, W., “Single Machine Problem with Quadratic Penalty Function of Completion Times: A Branch and Bound solution”, Management Science, Volume 24, No: 5, pp. 530-534, 1978.
• Nelson, R. T., Sarin, R. K. and Daniels, R. L., “Scheduling with Multiple Performance Measures: The One-Machine Case”, Management Science, Volume 32, No: 4, pp. 464-479, 1986.
• Liao, C-J., Huang, R-H., and Tseng, S-T., “Use of Variable Range in Solving Multiple Criteria Scheduling Problems”, Computers and Operations Research, Volume 19, No: 5, pp. 453-460, 1992.
• Hoogeveen, J. A., and Van de Velde S. L., “Minimizing Total Completion Time and Maximum Cost Simultaneously is Solvable in Polynomial Time”, Operations Research Letters, Volume 17, pp. 205-208, 1995.
• Köksalan, M., “A Heuristic Approach to Bicriteria Scheduling”, Naval Research Logistic, Volume 46, pp. 777-789, 1999.
• Burns, R. N., “Scheduling to Minimize The Weighted Sum of Completion Times with Secondary Criteria”, Naval Research Logistic Quarterly, Volume 23, No: 1, pp. 125-129, 1976.
• Bansal, S. P., “Single Machine Scheduling to Minimize Weighted Sum of Completion Times With Secondary Criterion: A Branch and Bound Approach”, European Journal of Operational Research, Volume 5, pp. 177–181, 1980.
• Miyazaki, S., “One Machine Scheduling Problem with Dual Criteria”, Journal of Operations Research Society of Japan, Volume24, No: 1, pp. 37-50, 1981.
• Shanthikumar, J., and Buzacott, J. A., “On The Use of Decomposition Approaches in A Single Machine Scheduling Problem”, Journal of The Operations Research Society of Japan, Volume 25, No: 1, pp. 29-47, 1983.
• Potts, C. N., and Van Wassenhove, L. N., “An Algorithm for Single Machine Sequencing with Deadlines to Minimize Total Weighted Completion Time”, European Journal of Operational Research, Volume 12, pp. 379-387, 1983.
• Posner, M. E., “Minimizing Weighted Completion Times with Deadlines”, Operations Research, Volume 33, No: 3, pp. 562-574, 1985.
• Chand, S. and Schneeberger, H., “A Note on The Single-Machine Scheduling Problem with Minimum weighted Completion Time and Maximum Allowable Tardiness”, Naval Research Logistic, Volume 33, pp. 551-557, 1986.
• Bagchi, U., and Ahmadi, R. H., “An Improved Lower Bound for Minimizing Weighted Completion Times with Deadlines”, Operations Research, Volume 35, pp. 311-313, 1987.
• Emmons, H., “One Machine Sequencing To Minimize Mean Flow Time with Minimum Number Tardy”, Naval Research Logistics Quarterly, Volume 22, pp. 585-592, 1975.
• Moore, J. M., “An n Jobs, One Machine Sequencing Algorithm for Minimizing The Number of Late Jobs”, Management Science, Volume 15, No: 1, pp. 102-109, 1968.
• Hodgson, T. J., “A Note on Single-Machine Sequencing with Random Processing Times”, Management Science, Volume 23, pp. 1144-1146, 1977.
• Kiran, A. S., and Unal, A. T., “A Single Machine Problem with Multiple Criteria”, Naval Research Logistics Quarterly, Volume 38, pp. 721-727, 1991.
• Kondakci, S. K. and Bekiroğlu, T., “Scheduling with Bicriteria Scheduling: Total Flowtime and Number of Tardy Jobs”, International Journal of Production Economics, Volume 53, pp. 91-99, 1997.
• Karasakal, E. K. and Köksalan, M., “A Simulated Annealing Approach to Bicriteria Scheduling Problems on a Single Machine”, Journal of Heuristics, Volume 6, pp. 311-327, 2000.
• Lawler, E. L., “Optimal Sequencing of A Single Machine Subject To Precedence Constraints”, Managemet Science, Volume 19, pp. 544-546, 1973.
• John, T. C., and Sadowski, R. P., On A Bicriteria Scheduling Problem, Presented at ORSA / Tims Meeting, Dallas, Texas, November, 1984.
• Cheng, T. C. E., “An Improved Solution Procedure for The Scheduling Problem”, Journal of Operations Research Society of Japan, Volume 42, No: 5, pp. 413-417, 1991.
• Hoogeveen, J. A., and Van de Velde, S. L., “Polinomial-Time Algorithms for Single Machine Multicriteria Scheduling”, Centre for Mathematics and Computer Science, P.O.Box. 4079, 1009 AB Amsterdam, The Netherland, 1-13, 1990.
• Köksalan, M., Azizoğlu, M. and Kondakçı, S. K., “Minimizing Flowtime and Maximum Earliness on a Single Machine”, IEE Transactions, Volume 30, pp. 192-200, 1998.
• Gelders, L. F., and Kleindorfer, P. R., “Coordinating Aggregate and Detailed Scheduling in The One Machine Job Shop, Part I. Theory”, Operations Research, Volume 22, pp. 46-60, 1974.
• Gelders, L. F., and Kleindorfer, P. R., “Coordinating Aggregate and Detailed Scheduling in The One Machine Job Shop, Part II. Computation and Structure”, Operations Research, Volume 23, No: 2, pp. 312-324, 1975.
• Fry, T. D., Leong, G. K. ve Rakes T. R., “Single Machine Scheduling: A Comparison of Two Solution Procedures”, OMEGA International Journal of Management Science, Volume 15, No: 4, pp. 277-282, 1987.
• Taboun, S. M., Abib, A. H. and Atmani, A., “Generating Efficient Points of Bicriteria Scheduling Problem by Using Compromise Programming”, Computers and Industrial Engineering, Volume 29, No: 1-4, pp. 227-231, 1995.
• Vickson, R. G., “Choosing The Job Sequence and Processing Times to Minimize Total Processing Plus Flow Cost on a Single Machine”, Operations Research, Volume 28, No: 5, pp. 1155-1167, 1980.
• Cheng, T. C. E., Kovalyov, M. Y., and Tuzikov, A. V., “Single Machine Group Scheduling with Two Ordered Criteria”, Journal of Operational Research Society, Volume 47, pp. 315-320, 1996.
• Fry, T. D. and Leong, G. K., “A Bi-criterion Approach to Minimizing Inventory Costs on a Single Machine When Early Shipments Are Forbidden”, Computers and Operations Research, Volume 14, No: 5, pp. 363-368, 1987.
• Elmaghraby, S. E., and Pulat, P. S., “Optimal Project Compresion with Due Dated Events”, Naval Research Logistics Quarterly, Volume 26, pp. 331-348, 1979.
• Lin K. S., “Hybrid Algorithm for Sequencing with Bicriteria”, Journal of Optimization Theory and Applications, Volume 39, No: 1, pp. 105-124, 1983.
• Hoogeveen, J. A., and Van De Velde, S. L., “Scheduling with Target Start Times”, European Journal of Operational Research, Volume 129, pp. 87-94, 2001.
• Gupta, J. N. D., Ho, J. C., and Van Der Veen, J. A. A., “Single Machine Hierarchical Scheduling with Customer Orders and Multiple Job Classes”, Annals of Operations Research, Volume 70, pp. 127-143, 1997.
• Ishii, H., Tada, M., and Nishida, T., “Bi-criteria Scheduling Problem on Uniform Processors”, Mathematical Japonica, Volume 35, No: 3, pp. 515-519, 1990.
• Daniels, R. L., “Incorporating Preference Information Into Multi-objective Scheduling”, European Journal of Operational Research, Volume 77, pp. 272-286, 1994.
• Shanthikumar, J. G., “Scheduling n Jobs on One Machine to Minimize the Maximum Tardiness with Minimum Number Tardy”, Computers and Operations Research, Volume 10, No: 3, pp. 255-266, 1983.
• Gupta, J. N. D., and Ramnarayanan, R., “Single Facility Scheduling with Dual Criteria: Minimizing Maximum Tardiness Subject to Minimum Number of Tardy Jobs”, Production Planning and Control, Volume 70, pp. 127-143, 1996.
• Gupta, J. N. D., Hariri, A. M. A. and Potts, C. N., “Single-Machine Scheduling to Minimize Maximum Tardiness with Minimum Number of Tardy Jobs”, Annals of Operations Research, Volume 92, pp. 107-123, 1999.
• Gupta, S., and Sen, T., “Minimizing The Range of Lateness on a Single Machine”, Journal of The Operations Research Society, Volume35, No: 9, pp. 853-857, 1984.
• Tegze, M., and Vlach, M., “Improved Bounds for The Range of Lateness on a Single Machine”, Journal of The Operations Research Society, Volume 39, No: 1, pp. 675-680, 1988.
• Liao, C-J., and Huang R-H., “An Algorithm for Minimizing The Range of Lateness on a Single Machine”, Journal of Operations Research Society, Volume 42, No: 2, pp. 183-186, 1991.
• Güner, E., Tek Makinalı Sistemler İçin Çok Ölçütlü Çizelgeleme Algoritmaları, Ph. D., Gazi Üniversitesi Fen Bilimleri Enstitüsü, Ankara, 1994.
• Güner, E., Erol, S., and Tani, K., “One Machine Scheduling to Minimize The Maximum Earliness with Minimum Number of Tardy Jobs”, International Journal of Production Economics, Volume 55, pp. 213-219, 1998.
• Hoogeveen, J. A., “Minimizing Maximum Promptness and Maximum Lateness on A Single Machine”, Mathematics of Operations Research, Volume 21, No: 1, 100-114, 1996.
• Carraway, R. L., Chambers, R. J., Morin, T. L., and Moskowitz, H., “Single machine Sequencing with Nonlinear Multicriteria Cost Functions: An Application of Generalized Dynamic Programming”, Computers and Operations Research, Volume 19, No: 1, pp. 69-77, 1992.
• Chang, P. C., and Su, L. H., “Scheduling n Jobs on One Machine to Minimize The Maximum Lateness with a Minimum Number of Tardy Jobs”, Computers and Industrial Engineering, Volume 40, pp. 349-360, 2001.
• Duffuaa, S. O., Raouf, A., Ben-Daya, M., and Makkı, M., “One-Machine Scheduling to Minimize Mean Tardiness with Minimum Number Tardy”, Production Planning ve Control, Volume 8, No: 3, pp. 226-230, 1997.
• Chang, P. C. and Lee, H. C., “A Greedy Heuristic for Bicriterion Single Machine Scheduling Problems”, Computers and Industrial Engineering, Volume 22, No: 2, pp. 121-131, 1992.
• De, P., Grosh, J. B., and Wells C. E., “Heuristic Estimation of The Efficent Frontier for a Bi-Criteria Scheduling Problem”, Decision Sciences, Volume 23, No: 3, pp. 596-609, 1992.
• Cheng, T. C. E., and Chen, Z.-L., Li, C.-L., and Lin, B. M. T., “Scheduling to Minimize The Total Compression and Late Costs”, Naval Research Logistics Quarterly, Volume 45, pp. 67-82, 1998a.
• Cheng, T. C. E., Janiak, A., and Kovalyov, M. Y., “Bicriterion Single Machine Scheduling with Resource Dependent Processing Time”, SIAM Journal on Optimization, Volume 8, No: 2, pp. 617-630, 1998b.
• Diskup, D., and Cheng, T. C. E., “Single-Machine Scheduling with Controllable Processing Times and Earliness, Tardiness and Completion Time Penalties”, Engineering Optimization, Volume 31, pp. 329-336, 1999.
• Klamroth, K., and Wiecek, M. M., “A Time-Dependent Multiple Criteria Single Machine Scheduling Problem”, European Journal of Operational Research, Volume 135, pp. 17-26, 2001.
• Lin, C-H., and Lee, C-Y., “Single-Machine Stochastic Scheduling with Dual Criteria”, IIE Transactions, Volume 27, pp. 244-249, 1995.
• Crabill T. B., and Maxwell, W. L., “Single-Machine Sequencing with Random Processing Time and Random Due-Dates”, Naval Research Logistics Quarterly, Volume 16, pp. 549-554, 1969.
• Frost, F. G., “Bicriterion Stochastic Scheduling on One or more Machines”, European Journal of Operational Research, Volume 80, pp. 404-409, 1995.
• Lawler, E. L., and Labetoulle, J., “On Preemptive Scheduling of Unrelated Parallel Processor”, Journal of The Association for Computing Machinery, Volume 25, pp. 612-619, 1978.
• Sundararaghavan, P., and Ahmed M., “Minimizing The Sum of Absolute Lateness in Single Machine and Multimachine Scheduling”, Naval Research Logistic Quarterly, Volume 31, pp. 325-333, 1984.
• Emmons, H., “Scheduling to A Common Due Date on Parallel Uniform Processors”, Naval Research Logistic, Volume 34, pp. 803-810, 1987.
• Leung, J.-T., and Young, G., “Minimizing Schedule Length Subject to Minimum flow Time”, SIAM Journal on Computing, Volume 18, pp. 314-326, 1989.
• Alidaee, B., and Ahmadian, A., “Two Parallel Machine Sequencing Problems Involving Controllable Job Processing Times”, European Journal of Operational Research, Volume 70, pp. 335-341, 1993.
• Cheng, T., and Chen, Z.–L., “Parallel-machine Scheduling Problems with Earliness and Tardiness Penalties”, Journal of Operational Research Society, Volume 45, pp. 685-695, 1994.
• Li, C.-J., and Cheng, T., “The Parallel Machine Min-max Weighted Absolute Lateness Scheduling Problem”, Naval Research Logistic, Volume 41, pp. 33-46, 1994.
• McCormick, S., and Pinedo, M., “Scheduling n Independent Jobs on m Uniform Machines with Both Flowtime and Makespan Objectives: A Parametric Analysis”, ORSA Journal on Computing, Volume 7, pp. 63-77, 1995.
• Suresh, V., and Chaudhuri, D., “Bicriteria Scheduling Problem for Unrelated Parallel Machines”, Computers and Industrial Engineering, Volume 30, No: 1, pp. 77-82, 1996.
• Mohri, S., Masuda, T., and Ishii, H., “Bi-criteria Scheduling Problem on Three Identical Parallel Machines”, International Journal of Production Economics, Volume 60-61, pp. 529-536, 1999.
• Sahni, S., “Preemptive Scheduling with Due Dates”, Operations Research, Volume 17, pp. 515-519, 1979.
• Gupta, J. N. D. and Ruiz-Torres, A. J., “Minimizing Makespan Subject to Minimum Total Flow-Time on Identical Parallel Machines”, European Journal of Operational Research, Volume 125, pp. 370-380, 2000.
• Gupta, J. N. D., Ho, J. C., and Webster, S., “Bicriteria Optimisation of The Makespan and Mean Flowtime on Two Identical Parallel Machines”, Journal of Operational Research Society, Volume 51, pp. 1330-1339, 2000.
• T’kindt, V., Billaut, J.-C., and Proust C., “Solving a Bicriteria Scheduling Problem on Unrelated Parallel Machines Occurring in The Glass Bottle Industry”, European Journal of Operational Research, Volume 135, pp. 42-49, 2001.