Resource-constrained project scheduling with renewable and non-renewable resources and time-resource tradeoffs

The resource-constraint project scheduling problem is modeled as a zero-one integer programming model. The model considers many important characteristics of project scheduling including activity preemption, renewable and non-renewable resources, time-resource tradeoffs, and multiple objectives. Solution algorithms are developed for three single objective problems (time minimization, cost minimization, and resource leveling) and for the preemptive goal programming model that includes time, cost and resource leveling objectives.

[1]  James H. Patterson,et al.  Scheduling a Project Under Multiple Resource Constraints: A Zero-One Programming Approach , 1976 .

[2]  Frederick Brian Talbot,et al.  An integer programming algorithm for the resource-constrained project scheduling problem , 1976 .

[3]  James H. Patterson,et al.  A Horizon-Varying, Zero-One Approach to Project Scheduling , 1974 .

[4]  W. L. Meyer,et al.  The resource scheduling problem in construction , 1964 .

[5]  R. Słowiński Multiobjective network scheduling with efficient use of renewable and nonrenewable resources , 1981 .

[6]  H. N. Ahuja Construction performance control by networks , 1976 .

[7]  James Herbert Patterson,et al.  Alternate Methods of Project Scheduling with Limited Resources , 1973 .

[8]  James M. Antill,et al.  Critical path methods in construction practice , 1970 .

[9]  Philip M. Wolfe,et al.  Multiproject Scheduling with Limited Resources: A Zero-One Programming Approach , 1969 .

[10]  Edward L. Hannan,et al.  The application of goal programming techniques to the CPM problem , 1978 .

[11]  James H. Patterson,et al.  An Efficient Integer Programming Algorithm with Network Cuts for Solving Resource-Constrained Scheduling Problems , 1978 .

[12]  Robert Blynn Harris,et al.  Precedence and Arrow Networking Techniques for Construction , 1980 .

[13]  J. MacGregor Smith,et al.  A multiobjective, multi-level heuristic for dynamic resource constrained scheduling problems , 1988 .

[14]  Salah E. Elmaghraby,et al.  Activity networks: Project planning and control by network models , 1977 .

[15]  Edward W. Davis,et al.  An Algorithm for Optimal Project Scheduling under Multiple Resource Constraints , 1971 .

[16]  F. Brian Talbot,et al.  Resource-Constrained Project Scheduling with Time-Resource Tradeoffs: The Nonpreemptive Case , 1982 .

[17]  E. W. Davis,et al.  Multiple Resource–Constrained Scheduling Using Branch and Bound , 1978 .

[18]  James H. Patterson,et al.  A Comparison of Exact Approaches for Solving the Multiple Constrained Resource, Project Scheduling Problem , 1984 .

[19]  Subhash C. Narula,et al.  Multi-Project Scheduling: Analysis of Project Performance , 1985 .

[20]  Said M. Easa,et al.  Resource Leveling in Construction by Optimization , 1989 .

[21]  R. P. Mohanty,et al.  Multiple projects-multiple resources-constrained scheduling: some studies , 1989 .

[22]  Edward W. Davis,et al.  A Comparison of Heuristic and Optimum Solutions in Resource-Constrained Project Scheduling , 1975 .

[23]  Edward W. Davis,et al.  Project Scheduling under Resource Constraints—Historical Review and Categorization of Procedures , 1973 .

[24]  Bruce M. Woodworth,et al.  A HEURISTIC ALGORITHM FOR RESOURCE LEVELING IN MULTI-PROJECT, MULTI-RESOURCE SCHEDULING , 1975 .

[25]  J. B. Ritter,et al.  The Critical-Path Method , 1965 .

[26]  Boyd C. Paulson,et al.  Professional construction management : including C.M., design-construct, and general contracting , 1992 .

[27]  Thomas Joel Russell Johnson,et al.  An algorithm for the resource constrained project scheduling problem , 1967 .

[28]  J. D. Wiest,et al.  Management Guide to PERT/CPM , 1969 .