Resource Constrained Project Scheduling: Computing Lower Bounds by Solving Minimum Cut Problems

Rolf H. Möhring, Andreas S. Schulz, Frederik Stork, and Marc Uetz

Extended abstract in: Algorithms - ESA'99, Jaroslav Nesetril (ed.), Lecture Notes in Computer Science 1643, Springer, Berlin, 1999, pages 139-150, Proceedings of the 7th Annual European Symposium on Algorithms.

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Scheduling, Project Scheduling, Lagrangian Relaxation, Subgradient Optimization, Minimum Cut

We propose a novel approach to compute bounds on the objective function value of a wide class of resource-constrained project scheduling problems. The basis is a polynomial-time algorithm to solve the following scheduling problem: Given a set of activities with start-time dependent costs and temporal constraints in the form of time windows, find a feasible schedule of minimum total cost. Motivated by a known result that this problem can be formulated as a cardinality-constrained stable set problem in comparability graphs, we show how to reduce it to a minimum cut problem in an appropriate directed graph. We then focus on an application of this algorithm to different types of resource-constrained project scheduling problems by using it for the computation of lower bounds on the objective function value via Lagrangian relaxation of these problems. This approach shows to be applicable to various problem settings, and an extensive study based on widely accepted test beds in project scheduling reveals that our algorithm significantly improves upon other fast computable lower bounds at very modest running times. For problems with time windows, we obtain the best known bounds for several instances, and for a class of notoriously hard labor-constrained scheduling problem with time-varying resources, we drastically reduce the time to obtain the lower bounds based on the corresponding LP relaxation. For precedence-constrained scheduling with several resource types, our bounds are again computed very fast, and improve the bounds obtained in reasonable time by all currently known algorithms.

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