A Primal-Dual Approximation Algorithm for Min-Sum Single-Machine Scheduling Problems

Abstract

We consider the following single-machine scheduling problem, which is often denoted 1||Σ fj: we are given n jobs to be scheduled on a single machine, where each job j has an integral processing time pj, and there is a nondecreasing, nonnegative cost function fj(Cj) that specifies the cost of finishing j at time Cj; the objective is to minimize Σj=1n fj(Cj). Bansal \& Pruhs recently gave the first constant approximation algorithm with a performance guarantee of 16. We improve on this result by giving a primal-dual pseudo-polynomial-time algorithm based on the recently introduced knapsack-cover inequalities. The algorithm finds a schedule of cost at most four times the constructed dual solution. Although we show that this bound is tight for our algorithm, we leave open the question of whether the integrality gap of the LP is less than 4. Finally, we show how the technique can be adapted to yield, for any ε >0, a (4+ε )-approximation algorithm for this problem.