Branch and bound crossed with GA to solve hybrid flowshops

This article deals with an optimal methods for solving a k-stage hybrid flowshop scheduling problem. This problem is known to be NP-hard. In 1991, Brah and Hunsucker proposed a branch and bound algorithm to solve this problem. However, for some medium size problems, the computation time is not acceptable. The aim of this article is to present an improvement of this algorithm. As a matter of fact, we prove that the value of their lower bound (LB) may decrease along a path of the search tree. First of all, we present an improvement of their LB. Then, we introduce several heuristics at the beginning of the search in order to compute an initial upper bound and genetic algorithm (GA) to improve during the search the value of the upper bound. More precisely, our GA takes into account the set of partial decisions made by the branch and bound and builds a series of populations of complete solutions with the aim of improving the upper bound (the best found criterion value corresponding to a complete solution). Experimentation show that the optimality of branch and bound is more often reached and the value of criterion is improved when our improvements are taken into account.