Abstract
Let us assume that a compound production system consists of an n number of production subsystems or equipments and that all of them can be modelled and characterised by certain parameters that determine some development state level of them (such levels may be their productivities. reliabilities. etc.)
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References
Mitten L G (1964) Composition Principles of Synthesis of Optimal Multistage Processes. Operations Research 12: 610–619
Farkas Z (1978) A general application of the method “Optimization with Minimal Information — OMI” to allocation problems (Hungarian with Russian and English resumes). MTA SZTAKI Közlemények (Proc. of Computer and Automation Inst. Hung. Academy of Sciences) 20: 53–69
Farkas Z (1980) Solution of a modified transportation problem with penalty function by the method “OMI”. Methods of Operations Research 40: 85–88
Farkas Z (1986) On some Systems Theoretical Aspects of Modelling and Solution of Compound Decision Systems. Methods of Operations Research 53: 399–410
Aczél J, Alsina C (1987) Synthesizing Judgements: A Functional Equation Approach. Math. Modelling 9: 311–320
Farkas Z (1987) An optimal allocation of investment for some development of compound decision systems. Methods of Operations Research 57: 11–12
Farkas Z (1989) On some extension of quasi-arithmetic means and their connection with solution of certain decision problems. Methods of Operations Research 60: 325–326
Farkas Z (1990) On an Optimum-invariance Property of Synthesizing Judgements: a Decision Model Approach. Methods of Operations Research 63: 265–268
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© 1993 Springer-Verlag Berlin Heidelberg
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Farkas, Z.M. (1993). On Some Solution Method of Certain Type of Allocation Problems. In: Karmann, A., Mosler, K., Schader, M., Uebe, G. (eds) Operations Research ’92. Physica, Heidelberg. https://doi.org/10.1007/978-3-662-12629-5_15
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DOI: https://doi.org/10.1007/978-3-662-12629-5_15
Publisher Name: Physica, Heidelberg
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