. . . . . . . . . . "Multiproject scheduling with limited resources: a zero-one programming approach"@en . . . . . . . "A zero-one (0-1) linear programming formulation of multiproject and job-shop scheduling problems is presented that is more general and computationally tractable than other known formulations. It can accommodate a wide range of real-world situations including multiple resource constraints, due dates, job splitting, resource substitutability, and concurrency and nonconcurrency of job performance requirements. Three possible objective functions are discussed: minimizing total throughput time for all projects: minimizing the time by which all projects are completed (i.e., minimizing makespan); and minimizing total lateness or lateness penalty for all projects."@en . . . . . . . . "Multiproject scheduling with limited resources : a zero-one programming approach" . "Multiproject scheduling with limited resources : a zero-one programming approach"@en . . "Multiproject sheduling with limited resources : a zero-one programming approach" . . . . "Multiproject Scheduling With Limited Resources - a Zero-One Programming Approach" . . . "RAND CORP SANTA MONICA CA." . . "Optimization." . . "Costs." . . "Decision theory." . . "Scheduling." . . "Operations Research." . . "Mathematical models." . . "Linear programming." . . "Mathematical programming." . . "Performance(human)" . .