@inproceedings{76224e9ff0ac4be7b1bc2d1ccd34f50c,
title = "Minimum average-cost production plan in a multi-product stochastic manufacturing system",
abstract = "This paper is concerned with the problem of production planning in a flexible manufacturing system consisting of a single or parallel failure-prone machines producing a number of different products. The objective is to choose the rates of production of the various products over time in order to meet their demands at the minimum long-run average cost of production and surplus. It is shown using the vanishing discount approach for the average cost problem that the Hamilton-Jacobi-Bellman equation in terms of directional derivatives has a solution consisting of the minimal average cost and the so-called potential function. The result helps in establishing a verification theorem, and in specifying an optimal control policy in terms of the potential function. The results settle a hitherto open problem as well as generalize known results.",
author = "Sethi, {S. P.} and W. Suo and Taksar, {M. I.} and H. Yan",
year = "1996",
language = "English",
volume = "1",
publisher = "IEEE",
pages = "361--365",
booktitle = "IEEE Symposium on Emerging Technologies & Factory Automation, ETFA",
address = "United States",
note = "Proceedings of the 1996 IEEE Conference on Emerging Technologies and Factory Automation, ETFA'96. Part 2 (of 2) ; Conference date: 18-11-1996 Through 21-11-1996",
}
