THE GREEDY PROCEDURE FOR RESOURCE-ALLOCATION PROBLEMS - NECESSARY AND SUFFICIENT CONDITIONS FOR OPTIMALITY

In many resource allocation problems, the objective is to allocate discrete resource units to a set of activities so as to maximize a concave objective function subject to upper bounds on the total amounts allotted to certain groups of activities. If the constraints determine a polymatroid and the objective is linear, it is well known that the greedy procedure results in an optimal solution. In this paper we extend this results to objectives that are 'weakly concave', a property generalizing separable concavity. We exhibit large classes of models for which the set of feasible solutions is a polymatroid and for which efficient implementations of the greedy procedure can be given.