Faculty of Mathematics - Computer Science
| Position | Head of the Department of Optimization and Systems |
| Citation name | Nguyen Le Hoang Anh, N.L.H. Anh |
| Field of Professional | Optimization Theory, Applied Mathematics |
| Year of appointment title of Associate Professor | 2019 |
| Style of citation | IEEE Style |
| Academic background | In 2007 HCMC University of Education BSc of Mathematics 鈥 Computer Science In 2010 VNUHCM-University MSc of Mathematics In 2014 University of Burgundy, France DSc of Mathematics |
| Name Languages | ASSOC.PROF. NGUY峄凬 L脢 HO脌NG ANH nlhanh@hcmus.edu.vn Vietnamese, English, French |
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PUBLICATION
1. N.L.H. Anh, P.Q. Khanh, L.T. Tung, Variational sets :聽 calculus and applications to nonsmooth vector optimization, Nonlinear Analysis : Theory, Method and Applications聽 74 (2011), 2358 鈥 2379.
2. N.L.H. Anh, P.Q. Khanh, L.T. Tung, Higher-order radial derivatives and optimality conditions in nonsmooth vector optimization, Nonlinear Analysis : Theory, Method and Applications聽 74 (2011), 7365 鈥 7379.
3. N.L.H.Anh, P.Q. Khanh, Higher-order optimality conditions in set-valued optimization using radial sets and radial derivatives,聽 Journal of Global Optimization 56 (2013), 519-536.
4. N.L.H. Anh, P.Q. Khanh, Variational Sets of聽 Perturbation Maps and Applications to聽 Sensitivity Analysis for Constrained Vector Optimization,聽 Journal of Optimization Theory and Applications 158 (2013), 363-384.
5. N.L.H.Anh, P.Q. Khanh, Higher-order optimality conditions for proper efficiency in nonsmooth vector optimization using radial sets and radial derivatives, Journal of Global Optimization, 58(2014), 693 – 709.
6. N.L.H.Anh, P.Q.Khanh, Calculus and applications of Studniarski鈥檚聽 derivatives聽 to sensitivity and implicit function theorems, Control and Cybernetics 43 (2014), 34-57.
7. N.L.H.Anh, Higher-order optimality conditions in set-valued optimization using Studniarski derivatives and applications to duality, Positivity 18 (2014), 449-473.
8. N.L.H. Anh, Higher-order optimality conditions for set-valued optimization with ordering cones having empty interior using variational sets, Positivity 20 (2016), 41-60.
9. N.L.H. Anh, On optimality conditions for quasi-relative efficient solutions in set-valued optimization, TOP 24 (2016), 259-272.
10. N.L.H. Anh, Higher-order optimality conditions for strict and weak efficient solutions in set-valued optimization, Positivity 20 (2016), 499-514.
11. N.L.H. Anh, On higher-order mixed duality in set-valued optimization, Bulletin of the Malaysian Mathematical Sciences Society, 41(2018), 723-739.
12. N.L.H. Anh, Duality and its applications to optimality conditions with nonsolid cones, Bulletin of the Malaysian Mathematical Sciences Society, 41(2018), 1061-1076.
13. N.L.H. Anh, Mixed type duality for set-valued optimization problems via higher-order
radial epiderivatives, Numerical Functional Analysis and Optimization, 37 (2016), 823-838.
14. N.L.H. Anh, Sensitivity analysis in constrained set-valued optimization via Studniarski derivatives, Positivity 21 (2017), 255-272.
15. N.L.H. Anh, P.Q. Khanh, Higher-order Karush-Kuhn-Tucker optimality conditions for set-valued optimization with nonsolid ordering cones, Positivity, 21 (2017), 931-953.
16. N.L.H. Anh, Duality for vector equilibrium problems with constraints, Bulletin of the Iranian Mathematical Society, 43 (2017), 1679-1694.
17. N.L.H. Anh, Some results on sensitivity analysis in set-valued optimization, Positivity 21 (2017), 1527-1543.
18. N.L.H. Anh, Higher-order generalized radial epiderivative and its applications to set-valued optimization problems, Bulletin of the Malaysian Mathematical Sciences Society, 42 (2019), 1853-1863.
19. N.L.H. Anh, Higher-order generalized Studniarski epiderivative and its applications in set-valued optimization, Positivity, 22 (2018), 1371-1385.
20. N.L.H. Anh, On sensitivity analysis of parametric set-valued equilibrium problems under the weak efficiency, Positivity, 23 (2019), 139-159.
21. N.L.H. Anh, Second-order sensitivity analysis for parametric equilibrium problems in set-valued optimization, RAIRO – Operations Research 53 (2019), 1245-1260.
22. N.L.H. Anh, Second-order composed contingent derivatives of perturbation maps in set-valued optimization, Computational and Applied Mathematics 38 (2019), 145.
23. N.L.H. Anh, On higher-order sensitivity analysis of parametric henig set-valued equilibrium problems, Numerical Functional Analysis and Optimization, 40 (2019), 1822-1839
24. N.L.H.Anh, N.T.Thoa, Calculus rules of the generalized contingent derivative and applications to set-valued optimization, Positivity 24 (2020), 81-94.
25. N.L.H. Anh, H.M. Linh, Sensitivity analysis for set-valued equilibrium problems, Positivity, 25 (2021), 31-48.
26. T.T.Khai, N.L.H.Anh, N.M.T.Giang, Higher-order tangent epiderivatives and applications to duality in set-valued optimization, Positivity 25, 1699-1720, 2021.
27. V.D. Thinh, T.D. Chuong, N.L.H. Anh, Optimality conditions for circular cone complementarity programs, Optimization, 71, 529-560 (2022).
28. V.D. Thinh, T.D. Chuong, N.L.H. Anh, Second order variational analysis of disjunctive constraint sets and its applications to optimization problems, Optimization Letters, 15, 2201-2224 (2021).
29. N.L.H. Anh, N.M.T. Giang, N.V. Thong, Higher-order tangent derivative and its applications to sensitivity analysis, Optimization Letters, 16, 1701-1724 (2022).
30. N.L.H. Anh, N.M.T. Giang, V.D. Thinh, On optimality conditions for set-valued equilibrium problems, Computational and Applied Mathematics, 41, 63 (2022).
31. V.D. Thinh, T.D. Chuong, N.L.H. Anh, Second order analysis for Robust inclusion systems and applications, Journal of Global Optimization, 85, 81 鈥 110 (2023).
32. N.L.H. Anh, V.D. Thinh, Higher-order generalized tangent epiderivatives and applications to set-valued optimization, Positivity, 26, 87, (2022).
1. N.L.H. Anh, The second-order contingent derivative of generalized perturbation maps, Journal of Science and Technology Development, 1 (T5), 203-213, 2017.
As the leader of the projects
1. 膼岷 h脿m suy r峄檔g v脿 c谩c 谩p d峄g trong t峄慽 瓢u 膽a tr峄 , Tr瓢峄漬g 膼H Khoa h峄峜 T峄 nhi锚n – 膼HQG HCM, 2016-2017.
2. M峄檛 s峄 v岷 膽峄 trong t峄慽 瓢u 膽a tr峄 , 膼HQG-HCM ,聽 2017-2019.
3.M峄檛 s峄 nghi锚n c峄﹗ v峄 t铆nh kh岷 vi suy r峄檔g , 膼HQG-HCM, 2020 -2022.
As a member of the projects
1. M峄檛 s峄 nghi锚n c峄﹗ 膽峄媙h t铆nh v峄 t峄搉 t岷, 峄昻 膽峄媙h v脿 膽i峄乽 ki峄噉 t峄慽 瓢u, Nafosted, 2009-2011.
2. M峄檛 s峄 v岷 膽峄 trong gi岷 t铆ch bi岷縩 ph芒n v脿 t峄慽 瓢u h贸a, Nafosted, 2012-2014.
3. 膼岷 h脿m suy r峄檔g v脿 t峄慽 瓢u kh么ng tr啤n, 膼HQG-HCM, 2013-2015.
4. M峄檛 s峄 v岷 膽峄 gi岷 t铆ch bi岷縩 ph芒n trong t峄慽 瓢u h贸a, 膼HQG-HCM, 2015-2017.
5. T峄慽 瓢u kh么ng tr啤n: 膼i峄乽 ki峄噉 t峄慽 瓢u v脿 t铆nh ch岷 t岷璸 nghi峄噈, Nafosted, 2014-2016.
6. Optimization in abstract spaces, Moravian-Silesian Region, Czech Republic, 2014-2015.
7. Gi岷 t铆ch bi岷縩 ph芒n trong nghi锚n c峄﹗ t铆nh ch岷 t岷璸 nghi峄噈 b脿i to谩n c芒n b岷眓g v脿 t峄慽 瓢u, Nafosted, 2017-2020.
8. Quy t岷痗 nh芒n t峄, s峄 t峄搉 t岷, x岷 x峄 v脿 峄昻 膽峄媙h nghi峄噈 b脿i to谩n t峄慽 瓢u, 膼HQG-HCM, 2018-2020.
9. 膼岷 h脿m suy r峄檔g trong t峄慽 瓢u kh么ng tr啤n, 膼H Tr脿 Vinh, 2019-2021.
10. M峄檛 s峄 t铆nh ch岷 t岷璸 nghi峄噈 cho c谩c b脿i to谩n li锚n quan t峄慽 瓢u, 膼HQG-HCM, 2022-2024.
1) Gi岷 th瓢峄焠g c么ng tr矛nh to谩n h峄峜 n膬m 2013, 2014, 2015, 2018, 2020 (thu峄檆 ch瓢啤ng tr矛nh tr峄峮g 膽i峄僲 qu峄慶 gia ph谩t tri峄僴 to谩n h峄峜 giai 膽o岷 2010-2020).
2) Th瓢峄焠g c么ng b峄 qu峄慶 t岷 – 膼HQG HCM 2018, 2019, 2020, 2021, 2022.
3) Chi岷縩 s末 thi 膽ua c岷 c啤 s峄: 2010, 2011, 2014 , 2017, 2018, 2019, 2020, 2021, 2022.
4) Chi岷縩 s末 thi 膽ua c岷 膼HQG: 2019.
5) Chi岷縩 s末 thi 膽ua c岷 B峄: 2020.
6) B岷眓g khen Gi谩m 膽峄慶 膼HQG: 2018.
7) B岷眓g khen B峄 Tr瓢峄焠g B峄 Gi谩o d峄 v脿 膼脿o t岷: 2020, 2022.