http://orcid.org/0000-0001-5415-8231
References
- Aloulou, M.A., Dolgui, A. and Kovalyov, M.Y. (2014) A bibliography of non-deterministic lot-sizing models. International Journal of Production Research, 52(8), 2293–2310.
- Anily, S., Beja, A. and Mendel, A. (2002) Optimal lot sizes with geometric production yield and rigid demand. Operations Research, 50(3), 424–432.
- Bookbinder, J.H. and Tan, J.-Y. (1988) Strategies for the probabilistic lot-sizing problem with service-level constraints. Management Science, 34(9), 1096–1108.
- Brandimarte, P. (2006) Multi-item capacitated lot-sizing with demand uncertainty. International Journal of Production Research, 44(15), 2997–3022.
- Grasman, S.E., Olsen, T.L. and Birge, J.R. (2008) Setting basestock levels in multi-product systems with setups and random yield. IIE Transactions, 40(12), 1158–1170.
- Grosfeld-Nir, A. and Gerchak, Y. (2004) Multiple lotsizing in production to order with random yields: Review of recent advances. Annals of Operations Research, 126(1-4), 43–69.
- Guu, S.M. and Zhang, A.X. (2003) The finite multiple lot sizing problem with interrupted geometric yield and holding costs. European Journal of Operational Research, 145(3), 635–644.
- Helber, S., Sahling, F. and Schimmelpfeng, K. (2013a) Dynamic capacitated lot sizing with random demand and dynamic safety stocks. OR Spectrum, 35(1), 75–105.
- Helber, S., Sahling, F. and Schimmelpfeng, K. (2013b) First results on robust dynamic lot sizing with capacity constraints and random yield, in H. Tempelmeier, and H. Kuhn (eds), Proceedings of the Ninth International Conference on Stochastic Models of Manufacturing and Service Operations, pp. 55–62. Catholic University of Eichstätt-Ingolstadt, Ingolstadt.
- Hsu, H.M., Su, T.S., Wu, M.C. and Huang, L.C. (2009) Multiple lot-sizing decisions with an interrupted geometric yield and variable production time. Computers and Industrial Engineering, 57(3), 699–706.
- Kazaz, B. (2004) Production planning under yield and demand uncertainty with yield-dependent cost and price. Manufacturing and Service Operations Management, 6(3), 209–224.
- Little, J.D.C. (1961) A proof for the queuing formula: L = λ W. Operations Research, 9(3), 383–387.
- Maes, J. and van Wassenhove, L.N. (1986) A simple heuristic for the multi item single level capacitated lotsizing problem. Operations Research Letters, 4(6), 265–273.
- Mazzola, J.B., McCoy, W.F. and Wagner, H.M. (1987) Algorithms and heuristics for variable-yield lot sizing. Naval Research Logistics, 34(1), 67–86.
- Porteus, E.L. (1986) Optimal lot sizing, process quality improvement and setup cost reduction. Operations Research, 34(1), 137–144.
- Powell, W.B. (2011) Approximate Dynamic Programming: Solving the Curses of Dimensionality, second edition, Wiley, Hoboken, NJ.
- Puterman, M.L. (2005) Markov Decision Processes: Discrete Stochastic Dynamic Programming, Wiley-Interscience, Hoboken, NJ.
- Rajaram, K. and Karmarkar, U.S. (2002) Product cycling with uncertain yields: Analysis and application to the process industry. Operations Research, 50(4), 680–691.
- Schneider, H. (1981) Effect of service-levels on order-points or order-levels in inventory models. International Journal of Production Research, 19(6), 615–631.
- Shih, W. (1980) Optimal inventory policies when stockouts result from defective products. International Journal of Production Research, 18(6), 677–686.
- Silver, E.A. (1976) Establishing the reorder quantity when the amount received is uncertain. INFOR, 14(1), 32–39.
- Taleizadeh, A.A., Niaki, S.T. and Najafi, A.A. (2010) Multiproduct single-machine production system with stochastic scrapped production rate, partial backordering and service level constraint. Journal of Computational and Applied Mathematics, 233(8), 1834–1849.
- Tempelmeier, H. (2011) A column generation heuristic for dynamic capacitated lot sizing with random demand under a fill rate constraint. Omega, 39(6), 627–633.
- Tempelmeier, H. and Herpers, S. (2010) ABCβ—A heuristic for dynamic capacitated lot sizing with random demand under a fill rate constraint. International Journal of Production Research, 48(17), 5181–5193.
- Tempelmeier, H. and Hilger, T. (2015) Linear programming models for a stochastic dynamic capacitated lot sizing problem. Computers & Operations Research, 59, 119–125.
- Wu, M.C., Huang, L.C., Hsu, H.M. and Su, T.S. (2011) Multiple lot-sizing decisions in a two-stage production with an interrupted geometric yield and non-rigid demand. Journal of the Operational Research Society, 62(6), 1075–1084.
- Yano, C.A. and Lee, H.L. (1995) Lot sizing with random yields: A review. Operations Research, 43(2), 311–334.