Hoàng Thế Tuấn
PGS. TS. NCVC
Phòng Phương trình vi phân
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Liên hệ
Phòng làm việc: 309, Nhà A5
Điện thoại: +84 (02)4 37563474 /309
Email: httuan AT math.ac.vn
DANH SÁCH CÔNG TRÌNH
Danh sách trong Mathscinet
Danh sách gần đây1 | Kai Diethelm, Safoura Hashemishahraki, Ha Duc Thai, Hoàng Thế Tuấn, Stability Properties of Multi-Order Fractional Differential Systems in 3D, IFAC-PapersOnLine, Volume 58, Issue 12, , 2024, Pages 231-236. |
2 | Le Trung Hieu, La Van Thinh, Hoàng Thế Tuấn, Stability analysis of homogeneous cooperative positive differential systems with time-varying delays and its generalization, Systems & Control Letters, Volume 191, September 2024, 105868, (SCI-E, Scopus). |
3 | Kai Diethelm, Safoura Hashemishahraki, Ha Duc Thai, Hoàng Thế Tuấn, A constructive approach for investigating the stability of incommensurate fractional differential systems. Journal of Mathematical Analysis and Applications, Volume 540, Issue 2, 2024, 128642. (SCI-E, Scopus). |
4 | La Van Thinh, Hoàng Thế Tuấn, Separation of solutions and the attractivity of fractional-order positive linear delay systems with variable coefficients, Communications in Nonlinear Science and Numerical Simulation, Volume 132, May 2024, 10789, (SCI-E, Scopus). |
5 | Hoàng Thế Tuấn, La Văn Thịnh, Qualitative analysis of solutions to mixed-order positive linear coupled systems with bounded or unbounded delays, ESAIM: Control, Optimisation and Calculus of Variations, 29 (2023) 1-35, (SCI_E, Scopus). |
6 | Nguyen Van Dac, Hoàng Thế Tuấn, Tran Van Tuan, Regularity and large-time behavior of solutions for fractional semilinear mobile-immobile equations. Mathematical Methods in the Applied Sciences, 46 (2023), Pages 1005-103. doi:10.1002/mma.8563 (SCI-E, Scopus). |
7 | Kai Diethelm, Ha Duc Thai, Hoàng Thế Tuấn, Asymptotic behaviour of solutions to non-commensurate fractional-order planar systems, Fractional Calculus and Applied Analysis 25 (2022), pp. 1324–1360, (SCI-E, Scopus). |
8 | Duong Giao Ky, La Van Thinh, Hoàng Thế Tuấn, Existence, uniqueness and asymptotic behavior of solutions to two-term fractional differential equations. Communications in Nonlinear Science and Numerical Simulation, Volume 115, 2022, 106751, (SCI-E, Scopus). |
9 | K. Diethelm, Hoàng Thế Tuấn, Upper and lower estimates for the separation of solutions to fractional differential equations, Fractional Calculus and Applied Analysis volume 25 (2022), pages 166–180, (SCI-E, Scopus). |
10 | Hoàng Thế Tuấn, Smallest asymptotic bound of solutions to positive mixed fractional-order inhomogeneous linear systems with time-varying delays. Journal of the Franklin Institute,359 (2022), Issue 8, Pages 3768-3778, (SCI-E, Scopus). |
11 | Hoàng Thế Tuấn, Ha Duc Thai, Roberto Garappa, An analysis on solutions to fractional neutral differential equations with a delay. Communications in Nonlinear Science and Numerical Simulation, 100 (2021), 105854, (SCI-E, Scopus). |
12 | Hoàng Thế Tuấn, On the existence and uniqueness of weak solutions to time-fractional elliptic equations with time-dependent variable coefficients, Proceedings of the American Mathematical Society, 149 (2021), 2597-2608, (SCI-E, Scopus). |
13 | Hoàng Thế Tuấn, Hieu Trinh, James Lam, Necessary and sufficient conditions of the positivity and stability to mixed fractional-order systems. International Journal of Robust and Nonlinear Control, 31 (2021), no. 1, pp. 37-50, SCI-E, Scopus. |
14 | Hoàng Thế Tuấn, On the asymptotic behavior of solutions to time-fractional elliptic equations driven by a multiplicative white noise. Discrete and Continuous Dynamical Systems - Series B, 26 (2021), no. 3, pp. 1749-1762, SCI-E, Scopus. |
15 | Hoàng Thế Tuấn, H.Trinh, A Qualitative Theory of Time Delay Nonlinear Fractional-Order Systems. SIAM Journal on Control and Optimization, 58(3), 1491–1518, (SCI(-E); Scopus). |
16 | Hoàng Thế Tuấn, H. Trinh, Global attractivity and asymptotic stability of mixed-order fractional systems. IET Control Theory & Applications, Volume 14 (2020), 1240 – 1245. (SCI(-E); Scopus). |
17 | Hoàng Thế Tuấn, Stefan Siegmund, Stability of scalar nonlinear fractional differential equations with linearly dominated delay. Fractional Calculus and Applied Analysis, 23 (2020), no. 1, pp. 250-267, (SCI(-E), Scopus). |
18 | Nguyễn Đình Công, Hoàng Thế Tuấn, H.Trinh, On asymptotic properties of solutions to fractional differential equations, Journal of Mathematical Analysis and Applications 484(2020) 123759, SCI(-E); Scopus. |
19 | P.T. Anh, P. Jurgas, M. Niezabitowski, Hoàng Thế Tuấn, A lower bound on the separation between two solutions of a scalar Riemann-Liouville fractional differential equation, AIP Conference Proceedings 2116, 450095 (2019). |
20 | Hoàng Thế Tuấn, Adam Czornik, Juan J. Nieto, and Michał Niezabitowski, Global attractivity for some classes of Riemann-Liouville fractional differential systems. Journal of Integral Equations and Applications, 31 (2019), 265-282, SCI(-E), Scopus. |
21 | Hoàng Thế Tuấn, Hieu Trinh, Stability of fractional-order nonlinear systems by Lyapunov direct method. IET Control Theory and Applications, 12 (2018), pp. 2417-2422, SCI(-E); Scopus. |
22 | Đoàn Thái Sơn, P.T. Huong, P.E. Kloeden, Hoàng Thế Tuấn, Asymptotic separation between solutions of Caputo fractional stochastic differential equations. Stochastic Analysis and Applications, 36 (2018), issue 4, 654-664 (SCI(-E); Scopus). |
23 | Hoàng Thế Tuấn, Hieu Trinh, A linearized stability theorem for nonlinear delay fractional differential equations. IEEE Transactions on Automatic Control, 63(2018), 3180 - 3186, SCI(-E); Scopus. |
24 | Nguyễn Đình Công, Đoàn Thái Sơn, Hoàng Thế Tuấn, Asymptotic stability of linear fractional systems with constant coefficients and small time dependent perturbations. Vietnam Journal of Mathematics. 46(2018), pp 665–680, Scopus. |
25 | Nguyễn Đình Công, Hoàng Thế Tuấn, Generation of nonlocal fractional dynamical systems by fractional differential equations. Journal of Integral Equations and Applications, 29 (2017), 1-24, SCI(-E); Scopus. |
26 | Kai Diethelm, Stefan Siegmund, Hoàng Thế Tuấn, Asymptotic behavior of solutions of linear multi-order fractional differential equation systems. Fractional Calculus and Applied Analysis, 20 (2017), 1165–1195, SCI(-E); Scopus. |
27 | Nguyễn Đình Công, Hoàng Thế Tuấn, Existence, uniqueness and exponential boundedness of global solutions to delay fractional differential equations, Mediterranean Journal of Mathematics, 14 (2017), SCI(-E); Scopus. |
28 | Nguyễn Đình Công, Đoàn Thái Sơn, Hoàng Thế Tuấn, A Perron-type theorem for fractional differential systems. Electronic Journal of Differential Equations, 2017 (2017), No. 142, 1-12, SCI(-E); Scopus. |
29 | Nguyễn Đình Công, Đoàn Thái Sơn, Stefan Siegmund, Hoàng Thế Tuấn, An instability theorem for nonlinear fractional differential systems. Discrete and Continuous Dynamical Systems - Series B, 22 ( 2017), 3079 - 3090, SCI(-E); Scopus. |
30 | Nguyễn Đình Công, Đoàn Thái Sơn, S. Siegmund, Hoàng Thế Tuấn, On stable manifolds for fractional differential equations in high-dimensional spaces, Nonlinear Dynamics, 86 (2016), 1885–1894, SCI(-E); Scopus. |
31 | Nguyễn Đình Công, Đoàn Thái Sơn, Siegmund Stefan, Hoàng Thế Tuấn, Linearized asymptotic stability for fractional differential equations, Electronic Journal of Qualitative Theory of Differential Equations, 39 (2016), 1-13, SCI(-E); Scopus. |
32 | Nguyễn Đình Công, Đoàn Thái Sơn, Hoàng Thế Tuấn, Stefan Siegmund, Structure of the Fractional Lyapunov Spectrum for Linear Fractional Differential Equations, Advances in Dynamical Systems and Applications, 9 (2014), 149-159, SCI(-E), Scopus. |
33 | Nguyễn Đình Công, Đoàn Thái Sơn, Hoàng Thế Tuấn, On fractional lyapunov exponent for solutions of linear fractional differential equations, Fractional Calculus and Applied Analysis, 17 (2014), 285-306, SCI(-E); Scopus. |
34 | Nguyễn Đình Công, Đoàn Thái Sơn, Stefan Siegmund, Hoàng Thế Tuấn, On stable manifolds for planar fractional differential equations, Applied Mathematics and Computation, 226 (2014), 1, 157-168, SCI(-E); Scopus. |
35 | Hoàng Thế Tuấn, Hai Dang and Vu Van Khu, Dynamics of a Stochastic predator-prey model with Beddington-DeAngelis functional response, SCIENTIA. Series A: Mathematical Sciences, ISSN: 0716-8446, 22, 75 -- 84. |
1 | IMH20241006, Ha Duc Thai, Hoàng Thế Tuấn, The oscillatory solutions of multi-order fractional differential equations. |
2 | IMH20241005, La Van Thinh, Hoàng Thế Tuấn, On the Mittag-Leffler stability of mixed-order fractional homogeneous cooperative delay systems |
3 | IMH20241004, La Van Thinh, Hoàng Thế Tuấn, Asymptotic behavior of solutions to some classes of multi-order fractional cooperative systems |
4 | IMH20241001, Hà Đức Thái, Hoàng Thế Tuấn, Modified Mikhailov stability criterion for non-commensurate fractional-order neutral differential systems with delays |
Tin tức nổi bật
29/11/24, Hội nghị, hội thảo: ICTP and Vietnamese Science: Celebrating 60 Years of Collaborations |
02/12/24, Hội nghị, hội thảo: International workshop on “Commutative Algebra and related Combinatoric structures” |