D
Inventory and Production
  1. Applied Model Building Illustrated by an Inventory Problem. Entretiens de Monaco en Sciences Humaines, Session 1964. Edition "Sciences Humaines" 209-218.
  2. Reliability Equation for an Inventory Problem and its Asymptotic Solutions. Coll. on Appl. of Math. to Economics. Publ. House of the H.A.S. Budapest, 1965, 317-327.
  3. The Order up to S Stochastic Inventory Model and its Extension to the Case of Interval - Type Arrival Process, Computers (Ministry of Heavy Industry) 1(1971) 34-45 (in Hungarian).
  4. Stochastic Programming Models for Inventory Control and Water Storage Problems. Inventory Control and Water Storage. Colloquia Mathematica Societatis János Bolyai 7. North Holland Publishing Company 1973, 229-245.
  5. Generalizations of the Theorems of Smirnov with Applications to a Reliability Type Inventory Problem. Mathematische Operationsforschung und Statistik 4(1973) 283-297.
  6. Extension of the (s,S) Inventory Control Model to the Case of an Interval Type Arrival Process. Applied Mathematical Papers (Alkalmazott Matematikai Lapok) 1(1975) 181-187 (in Hungarian). With L. Gerencsér.
  7. Reliability Type Inventory Models Based on Stochastic Programming. Mathematical Programming Study 9(1978) 43-58. In: Survey of Math. Prog. (A. Prékopa, editor). Publ. House of the H.A.S., Budapest, 1979, Vol. II, 167-182. With P. Kelle.
  8. Reliability Type Inventory Models: A Survey, Economics and Management of Inventories, Proceedings of the International Conference on Inventory Control, (A. Chikán editor). Publ. House of the H.A.S., Budapest, 1981, 477-490.
  9. Reliability Type Inventory Models. In: Inventories in the National and Industrial Economies. (É. Barancsi, A. Chikán editors.). H.A.S., 1981, 341-357.
  10. A Variant of the Hungarian Inventory Control Model. International Journal of Production Economics 103, 784-797. With N. Noyan.
  11. On the Hungarian Inventory Control Model. European Journal of Operational Research 171(2006) 894-914.