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Publications in Math-Net.Ru |
Citations |
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2019 |
1. |
K. G. Kuzmin, V. R. Haritonova, “Estimating the stability radius of an optimal solution to the simple assembly line balancing problem”, Diskretn. Anal. Issled. Oper., 26:2 (2019), 79–97 ; J. Appl. Industr. Math., 13:2 (2019), 250–260 |
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2017 |
2. |
Ya. Zhyvitsa, K. G. Kuz'min, “On calculation of the stability radius for a minimum spanning tree”, Journal of the Belarusian State University. Mathematics and Informatics, 1 (2017), 34–38 |
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2015 |
3. |
Vladimir A. Emelichev, Kirill G. Kuzmin, Vadim I. Mychkov, “Estimates of stability radius of multicriteria Boolean problem with Hölder metrics in parameter spaces”, Bul. Acad. Ştiinţe Repub. Mold. Mat., 2015, no. 2, 74–81 |
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4. |
K. G. Kuzmin, “A united approach to finding the stability radii in a multicriteria problem of a maximum cut”, Diskretn. Anal. Issled. Oper., 22:5 (2015), 30–51 ; J. Appl. Industr. Math., 9:4 (2015), 527–539 |
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2013 |
5. |
V. A. Emelichev, K. G. Kuzmin, “Stability analysis of the efficient solution to a vector problem of a maximum cut”, Diskretn. Anal. Issled. Oper., 20:4 (2013), 27–35 |
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6. |
V. A. Emelichev, K. G. Kuz'min, “Estimating the stability radius of the vector MAX-CUT problem”, Diskr. Mat., 25:2 (2013), 5–12 ; Discrete Math. Appl., 23:2 (2013), 145–152 |
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7. |
V. A. Emelichev, K. G. Kuz'min, “Stability conditions for a multicriteria Boolean problem of minimizing projections of linear functions”, Trudy Inst. Mat. i Mekh. UrO RAN, 19:2 (2013), 125–133 |
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2010 |
8. |
Vladimir Emelichev, Vladimir Korotkov, Kirill Kuzmin, “On stability of Pareto-optimal solution of portfolio optimization problem with Savage's minimax risk criteria”, Bul. Acad. Ştiinţe Repub. Mold. Mat., 2010, no. 3, 35–44 |
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9. |
V. A. Emelichev, A. V. Karpuk, K. G. Kuzmin, “On quasistability of the lexicographic minimax combinatorial problem with decomposing variables”, Diskretn. Anal. Issled. Oper., 17:3 (2010), 32–45 |
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10. |
V. A. Emelichev, A. V. Karpuk, K. G. Kuz'min, “On a measure of quasistability of a certain vector linearly combinatorial Boolean problem”, Izv. Vyssh. Uchebn. Zaved. Mat., 2010, no. 5, 8–17 ; Russian Math. (Iz. VUZ), 54:5 (2010), 6–14 |
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2008 |
11. |
V. A. Emelichev, K. G. Kuz'min, “On stability of a vector combinatorial problem with MINMIN criteria”, Diskr. Mat., 20:4 (2008), 3–7 ; Discrete Math. Appl., 18:6 (2008), 557–562 |
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2007 |
12. |
A. G. Vodennikov, V. A. Emelichev, K. G. Kuz'min, “Об одном типе устойчивости векторной комбинаторной задачи размещения”, Diskretn. Anal. Issled. Oper., Ser. 2, 14:2 (2007), 32–40 |
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13. |
V. A. Emelichev, K. G. Kuz'min, “A general approach to studying the stability of a Pareto optimal solution of a vector integer linear programming problem”, Diskr. Mat., 19:3 (2007), 79–83 ; Discrete Math. Appl., 17:4 (2007), 349–354 |
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2006 |
14. |
Vladimir A. Emelichev, Olga V. Karelkina, Kirill G. Kuzmin, “Measure of stability and quasistability to a vector integer programming problem in the $l_1$ metric”, Bul. Acad. Ştiinţe Repub. Mold. Mat., 2006, no. 1, 39–50 |
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2005 |
15. |
V. A. Emelichev, K. G. Kuz'min, “Analysis of the sensitivity of an efficient solution of a vector Boolean problem of the minimization of projections of linear functions onto $\mathbb R_+$ and $\mathbb R_-$”, Diskretn. Anal. Issled. Oper., Ser. 2, 12:2 (2005), 24–43 |
5
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16. |
V. A. Emelichev, K. G. Kuz'min, “Measure of quasistability in the metric $l_1$ of a vector combinatorial problem with a parametric optimality principle”, Izv. Vyssh. Uchebn. Zaved. Mat., 2005, no. 12, 3–10 ; Russian Math. (Iz. VUZ), 49:12 (2005), 1–8 |
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2004 |
17. |
V. A. Emelichev, K. G. Kuz'min, A. M. Leonovich, “Stability in the combinatorial vector optimization problems”, Avtomat. i Telemekh., 2004, no. 2, 79–92 ; Autom. Remote Control, 65:2 (2004), 227–240 |
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18. |
V. A. Emelichev, K. G. Kuz'min, “Stability analysis of a strictly efficient solution of a vector problem of Boolean programming in the metric $l_1$”, Diskr. Mat., 16:4 (2004), 14–19 ; Discrete Math. Appl., 14:5 (2004), 521–526 |
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19. |
V. A. Emelichev, K. G. Kuz'min, A. M. Leonovich, “On a type of stability for a vector combinatorial problem with partial criteria of the form $\Sigma$-MINMAX and $\Sigma$-MINMIN”, Izv. Vyssh. Uchebn. Zaved. Mat., 2004, no. 12, 17–27 ; Russian Math. (Iz. VUZ), 48:12 (2004), 15–25 |
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