Approximation Algorithms for Certain Scheduling Problems

Abstract

A subset of a set of tasks ℱ is to be scheduled on a single processor. Associated with each task J time μ(J) and profit p(J). The tasks have precedence constraints in that a task cannot be scheduled until all of its predecessors have been scheduled. Approximation algorithms of polynomial time complexity are presented for the following problems: MAXPROFIT problem. Given T, the available processor time, find a subset L of ℱ such that ∑_L∈Lμ(J) ≤ T and ∑_J∈LP(J) is maximal. MINTIME problem. Given P, the minimum profit desired, find a subset L of ℱ such that ∑_J∈LP(J) ≥ p and ∑_J∈Lμ(J) is minimal.