A Novel exact algorithm for economic lot-sizing with piecewise linear production costs

Abstract

In this paper, we study the single-item economic lot-sizing problem with production cost functions that are piecewise linear. The lot-sizing problem stands as a foundational cornerstone within the domain of lot-sizing problems. It is also applicable to a variety of important production planning problems which are special cases to it according to ou. The problem becomes intractable when m, the number of different breakpoints of the production-cost function is variable as the problem was proven NP-hard by Florian1980. For a fixed m an O(T2m+3) time algorithm was given by Koca2014 which was subsequently improved to O(Tm+2(T)) time by ou where T is the number of periods in the planning horizon. We introduce a more efficient O(Tm+2) time algorithm for this problem which improves upon the previous state-of-the-art algorithm by Ou and which is derived using several novel algorithmic techniques that may be of independent interest.