Abstract
The paper presents a survey of analysis of different types of stability in vector (multiple-criteria) combinatorial problem with the parametrized optimality principle. Formulas of “stability sphere” radius are given along with qualitative characteristics of stability.
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REFERENCES
I. V. Sergienko, L. N. Kozeratskaya, and T. T. Lebedeva, Stability and Parametric Analysis of Discrete Optimization Problems [in Russian], Naukova Dumka, Kiev (1995).
L. N. Kozeratskaya, T.T. Lebedeva, and I. V. Sergienko, “Stability of discrete optimization problems,” Kibern. Sist. Analiz, No. 3, 78-93 (1993).
Yu. N. Sotskov, V. K. Leontev, and E. N. Gordeev, “Some concepts of stability analysis in combinatorial optimization,” Descrete Appl. Math., 58, No. 2, 169-190 (1995).
Yu. N. Sotskov, V. S. Tanaev, and F. Werner, “Stability radius of an optimal schedule: A survey and recent developments,” in: Industrial Applications of Discrete Optimization, 16, Kluwer Academic Publ., Boston (MA) (1998), pp. 72-108.
H. J. Greenberg, “An annotated bibliography for post-solution analysis in mixed integer programming and combinatorial optimization,” in: Advances in Computational and Stochastic Optimization, Logic Programming and Heuristic Search, Kluwer Academic Publ., Boston (MA) (1998), pp. 97-148.
V. A. Emelichev and D. P. Podkopaev, “Stability and regularization of vector problems of integer linear programming,” Diskret. Analiz I Issled. Operatsii, Ser. 2, 8, No. 1, 47-69 (2001).
V. A. Emelichev, E. Girlich, Yu. V. Nikulin, and D. P. Podkopaev, “Stability and regularization of vector problems of integer linear programming,” Optimization, 51, No. 4, 645-676 (2002).
V. M. Glushkov, “Systemwise optimization,” Kibernetika, No. 5, 89-90 (1980).
V. M. Glushkov, V. S. Mihalevich, V. L. Volkovich, and G. A. Dolenko, “The problem of system optimization in multicriteria problems of linear programming,” Kibernetika, No. 3, 4-9 (1982).
V. M. Glushkov, V. S. Mihalevich, V. L. Volkovich, and G. A. Dolenko, “System optimization and multitest linear programming problems for preference assigned as intervals,” Kibernetika, No. 3, 1-8, 15 (1983).
I. V. Sergienko and N. V. Semenova, “Integer programming problems with inexact data: exact and approximate solutions,” Kibern. Sist. Analiz, No. 6, 75-86 (1995).
I. V. Sergienko, V. A. Roshchin, and N. V. Semenova, “Some problems of integer programming with ambiguous data and their solutions,” Probl. Upravl. Inform., No. 6, 116-123 (1998).
I. V. Sergienko, T. T. Lebedeva, and N. V. Semenova, “Existence of solutions in vector optimization problems,” Kibern. Sist. Analiz, No. 6, 39-47 (2000).
V. A. Emelichev and M. K. Kravtsov, “Stability in vector optimization path problems,” Kibern. Sist. Analiz, No. 4, 137-142 (1995).
V. K. Leontyev, “Stability in linear discrete problems,” in: Problems of Cybernetics [in Russian], Issue 35, Nauka, Moscow (1979), pp. 169-184.
V. I. Artemenko, E. N. Gordeev, Yu. I. Zhuravlev et al., “Construction of optimal programmed paths for the motion of a robotic manipulator,” Kibern. Sist. Analiz, No. 5, 82-104 (1996).
E. Girlikh, M. M. Kovalev, and M. K. Kravtsov, “Stability, pseudostability, and quasistability of a multicriterion problem on a system of subsets,” Kibern. Sist. Analiz, No. 5, 111-124 (1999).
V. V. Podinovskii and V. D. Nogin, Pareto-Optimal Solutions of Multicriterion Problems [in Russian], Nauka, Moscow (1982).
B. G. Mirkin, The Problem of Group Choice [in Russian], Nauka, Moscow (1974).
L. A. Sholomov, “Analysis of relations in criteria spaces and synthesis of operators of group choice,” in: Mathematical Problems of Cybernetics [in Russian], Nauka, Moscow (1994), pp. 109-143.
M. A. Aizerman and F. T. Aleskerov, Alternative Choice: the Fundamentals [in Russian], Nauka, Moscow (1990).
D. B. Yudin, Computing Methods in Decision-Making Theory [in Russian], Nauka, Moscow (1989).
L. A. Sholomov, Logical Methods of Analysis of Discrete Models of Choice [in Russian], Nauka, Moscow (1989).
E. Moulen, Cooperative Decision-Making: Axioms and Models [Russian translation], Mir, Moscow.
Marauis de Condorset, Essai sur l'application de l'analyse a la probabilite des decisions rendues a la pluralite des voix, Paris (1785).
K. J. Arrow, Social Choice and Individual Values, 2nd ed, John Wiley, New York (1963).
V. I. Vol'skii and Z. M. Lezina, Voting in Small Groups: Procedures and Methods of Comparative Analysis [in Russian], Nauka, Moscow (1991).
Yu. A. Dubov, S. I. Travkin, and V. N. Yakimets, Multicriteria Models of Formation and Choice of System Variants [in Russian], Nauka, Moscow (1986).
V. A. Emelichev and A. V. Pashkevich, “Parametrization of the optimality principle in a criteria space,” Diskret. Analiz Issled. Oper., Ser. 2, 9, No. 1, 21-32 (2002).
V. A. Emelichev, E. Girlikh, and D. P. Podkopaev, “Stability of efficient solutions of the vector path problem of discrete optimization. I,” Izv. AN Resp. Moldova, Matem., No. 3, 5-16 (1996).
V. A. Emelichev and Yu. V. Nikulin, “Stability of an efficient solution of a vector problem of integer linear programming,” Dokl. NAN Belarusi, 44, No. 4, 26-28 (2000).
V. A. Emelichev and V. G. Pokhil'ko, “Sensitivity analysis of efficient solutions of a vector problem of minimization of linear forms on a set of substitutions,” Diskr. Matem., 12, Issue 3, 37-48 (2000).
V. A. Emelichev and Yu. V. Stepanishina, “Multicriteria linear combinatorial problems: parametrization of the optimality principle and stability of efficient solutions,” Diskr. Matem., 13, Issue 4, 43-51 (2001).
V. A. Emelichev and Yu. V. Stepanishina, “Stability of a majority efficient solution of a vector linear trajectorial problem,” Comp. Sci. J. of Moldova, 7, No. 3, 291-307 (1999).
V. A. Emelichev M. K. Kravtsov, and D. P. Podkopaev, “Quasistability of trajectory problems of vector optimization,” Mat. Zametki, 63, Issue 1, 21-27 (1998).
V. A. Emelichev and D. P. Podkopaev, “A quantitative measure of stability of a vector problem of integer linear programming,” Zh. Vych. Mat. Mat. Fiz., 38, No. 11, 1801-1805 (1998).
V. A. Emelichev and Yu. V. Stepanishina, “Quasistability of the vector trajectory problem of majority optimization,” Mat. Zametki, 72, Issue 1, 38-47 (2002).
V. A. Emelichev and Yu. V. Stepanishina, “The quasistability criterion for a vector path problem with a majority principle of optimality,” Kibern. Sist. Analiz, No. 5, 63-71 (2001).
S. E. Bukhtoyarov and V. A. Emelichev, “Parametrization of the optimality principle ('from Pareto to Slayter') and stability of multicriteria discrete problems,” Diskr. Analiz Issled. Oper., Ser. 2 (to be published) (2003).
J. Nash, Noncooperative Games. Matrix Games [Russian translation], Fizmatgiz, Moscow (1961), pp. 205-221.
L. A. Petrosyan, N. A. Zenkevich, and E. A. Semina, The Game Theory [in Russian], Vyssh. Shk., Moscow(1998).
E. Moulen, The Game Theory [Russian translation], Mir, Moscow (1985).
S. E. Bukhtoyarov and V. A. Emelichev, “Finite cooperative games: parametrization of the optimality principle ('from Pareto to Nash') and stability of generalized-efficient situations,” Dokl. NAN Belarusi,46, No. 6, 36-38 (2002).
A. N. Kolmogorov and S. V. Fomin, Elements of the Theory of Functions and Functional Analysis [in Russian], Nauka, Moscow (1972).
R. D. Luce and H. Raiffa, Games and Decisions, Introduction and Critical Survey, John Wiley & Sons, New York (1957). 614
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Bukhtoyarov, S.E., Emelichev, V.A. & Stepanishina, Y.V. Stability of Discrete Vector Problems with the Parametric Principle of Optimality. Cybernetics and Systems Analysis 39, 604–614 (2003). https://doi.org/10.1023/B:CASA.0000003509.09942.10
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DOI: https://doi.org/10.1023/B:CASA.0000003509.09942.10