Scalable Neighborhood Local Search for Single-Machine Scheduling with Family Setup Times

Abstract

In this work, we study the task of scheduling jobs on a single machine with sequence dependent family setup times under the goal of minimizing the makespan, that is, the completion time of the last job in the schedule. This notoriously NP-hard problem is highly relevant in practical productions and requires heuristics that provide good solutions quickly in order to deal with large instances. In this paper, we present a heuristic based on the approach of parameterized local search. That is, we aim to replace a given solution by a better solution having distance at most k in a pre-defined distance measure. This is done multiple times in a hill-climbing manner, until a locally optimal solution is reached. We analyze the trade-off between the allowed distance k and the algorithm's running time for four natural distance measures. Example of allowed operations for our considered distance measures are: swapping k pairs of jobs in the sequence, or rearranging k consecutive jobs. For two distance measures, we show that finding an improvement for given k can be done in f(k) · nO(1) time, while such a running time for the other two distance measures is unlikely. We provide a preliminary experimental evaluation of our local search approaches.