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Bài báo quốc tế

Những bài báo quốc tế từ năm 2006 đến nay:

Accepted Papers.

1. Le Dao Hai An, Le Van Hien, Tran Thi Loan, Exponential Stability of Non-Autonomous Neural Networks with Heterogeneous Time-Varying Delays and Destabilizing Impulses, Vietnam Journal of Mathematics 2016, doi: 10.1007/s10013-016-0217-8.
2. L.V. Hien, D.T. Son, H.M. Trinh, On Global Dissipativity of Nonautonomous Neural Networks With Multiple Proportional Delays, IEEE Transactions on Neural Networks and Learning Systems 2016, DOI: 10.1109/TNNLS.2016.2614998.
3. Hoang Viet Long, Juan José Nieto, Nguyen Thi Kim Son, New approach for studying nonlocal problems related to differential systems and partial differential equations in generalized fuzzy metric spaces, Fuzzy Sets and Systems 2016, In Press.
4. N.T.V. Anh, T.D. Ke, On the differential variational inequalities of parabolic-elliptic type, Math. Methods Appl. Sci. 2017 (accepted).
5. T.D. Ke, D. Lan, Fixed point approach for weakly asymptotic stability of fractional differential inclusions involving impulsive effects, J. Fixed Point Theory Appl. 2017 (accepted).
6. N.V. Dac, T.D. Ke, Asymptotic behavior for non-autonomous functional differential inclusions with measures of noncompactness, Topol. Methods Nonlinear Anal. (2017), in press.
7. L.V. Hien, T.D. Ke, C.T. Kinh, Globally attracting solutions to impulsive fractional differential inclusions of Sobolev type, Acta Math. Sci. 2017 (accepted).
8. C.T. Anh, J. Lee, B.K. My, On the classification of solutions to an elliptic equation involving the Grushin  operator, Complex Variables and Elliptic Equations 2017, in press.
9. C.T. Anh, V.M. Toi, Local exact controllability to trajectories of the magneto-micropolar fluid equations, Evol. Equ. Control Theory 2017, in press.
10. Pham Ngoc Thanh, Saeid Nahavandi, Le Van Hien, Hieu Trinh, Kit Po Wong, Static Output Feedback Frequency Stabilization of Time-Delay Power Systems with Coordinated Electric Vehicles State of Charge Control,  IEEE Transactions on Power Systems, doi: 10.1109/TPWRS.2016.2633540.
11. C.T. Kinh, L.V. Hien, T.D. Ke, Power-Rate Synchronization of Fractional-Order Nonautonomous Neural Networks with Heterogeneous Proportional Delays, Neural Processing Letters 2017, doi: 10.1007/s11063-017-9637-z.
12. L.V. Hien, C.T. Kinh, Decentralised stabilization of positive fractional-order interconnected systems,  IET Control Theory & Applications 2017, doi:10.1049/iet-cta.2016.1341.
13. L.V. Hien, An LP approach to full-order and reduced-order state estimations of positive Markov jump systems with delay, International Journal of Systems Science 2017, doi:10.1080/00207721.2017.1324066.

2017

1. Hoang Viet Long, Nguyen Thi Kim Son, Ha Thi Thanh Tam, The solvability of fuzzy fractional partial differential equations under Caputo gH-differentiability, Fuzzy Sets and Systems, 309 (2017), 35-63.
2. Le Van Hien, Hieu Trinh, A novel approach to exponential stability of continuous-time Roesser systems with directional time-varying delays, Journal of the Franklin Institute 354 (2017), 1023-1041.
3. Le Van Hien, Hieu Trinh,  Switching design for suboptimal guaranteed cost control of 2-D nonlinear switched systems in the Roesser model, Nonlinear Analysis: Hybrid Systems 24 (2017), 45-57.
4. Le Van Hien, On global exponential stability of positive neural networks with time-varying delay, Neural Networks 87 (2017), 22-26.
5. C.T. Anh, N.T. Da, The exponential behaviour and stabilizability of stochastic 2D hydrodynamical type systems, Stochastics 89 (2017), 593–618.
6. C.T. Anh, P.T. Trang, On the regularity and convergence of solutions to the 3D Navier–Stokes–Voigt equations, Comput. Math. Appl. 73 (2017), 601–615.
7. C.T. Anh, D.T.P. Thanh, N.D. Toan, Global attractors for nonclassical diffusion equations with hereditary memory and a new class of nonlinearities, Ann. Polon. Math. 119 (2017), no. 1, 1–21.
8. L.V. Hien, Existence and global asymptotic behavior of positive periodic solution of an SI epidemic model with delays, Dyn. Syst. 32 (2017), no. 2, 295–303.
9. D.A. Tuan, N.N. Thang, Liouville type theorems for elliptic equations involving Grushin operator and advection, Electron. J. Differential Equations 2017, No. 108, pp. 1-11.
10. H. Trinh, D. C. Huong, L.V. Hien, Saeid Nahavandi, Design of reduced-order positive linear functional observers for positive time-delay systems, IEEE Transactions on Circuits and Systems II: Express Briefs 64 (2017), 555 – 559.
11. N.T. Dzung, L.V. Hien, Stochastic Stabilization of Discrete-Time Markov Jump Systems with Generalized Delay and Deficient Transition Rates, Circuits, Systems, and Signal Processing 36 (2017), 2521–2541.
12. M. Dimassi, D.A. Tuan, Scattering and semi-classical asymptotics for periodic Schrodinger operators with oscillating decaying potential, Mathematical Journal of Okayama University, Vol 59 (2017), 149-174.
13. P.T. Duong, M. Reissig, The External Damping Cauchy Problems with General Powers of the Laplacian. In: Dang P., Ku M., Qian T., Rodino L. (eds) New Trends in Analysis and Interdisciplinary Applications. Trends in Mathematics. Birkhäuser, Cham 2017, pp 537-543.
14. Thanh Ngoc Pham, Saeid Nahavandi, Hieu Trinh, Le Van Hien, Decentralized bounded input bounded output stabilization of perturbed interconnected time-delay power systems with energy storages, International Journal of Electrical Power & Energy Systems 93 (2017), 51-64.
15. D.A. Tuan, P.Q. Hung, Liouville type theorem for nonlinear elliptic system involving Grushin operator, J. Math. Anal. Appl. 454 (2017), 785–801.

2016

1. N.M. Hung, N.T. Lien, On the asymptotic formulas of solutions to the boundary value problem without initial condition for Schrödinger systems in domain with conical points, Nonlinear Anal. 130 (2016), 18-30.
2. C.T. Anh, B.K. My, Existence of solutions to Δλ-Laplace equations without the Ambrosetti–Rabinowitz condition, Complex Variables and Elliptic Equations 61 (2016), no.1, 137-150.
3. Thanh Ngoc Pham, Hieu Trinh, Le Van Hien, Load Frequency Control of Power Systems With Electric Vehicles and Diverse Transmission Links Using Distributed Functional Observers, IEEE TRANSACTIONS ON SMART GRID 7 (2016), No.1, 238-252.
4. Le Van Hien, Hieu Trinh, Exponential stability of time-delay systems via new weighted integral inequalities, Appl. Math. Comput. 275 (2016), 335-344.
5. N.V. Loi, T.D. Ke, V. Obukhovskii and P. Zecca, Topological methods for some classes of differential variational inequalities, J. Nonlinear Convex Anal. 17 (2016), No.3, 403-419.
6. C.T. Anh, T.M. Nguyet, Optimal Control of the Instationary Three Dimensional Navier-Stokes-Voigt Equations, Numer. Funct. Anal. Optim. 37 (2016), no. 4, 415–439.
7. C.T. Anh, V.M. Toi, Null controllability in large time of a parabolic equation involving the Grushin operator with an inverse-square potential, NoDEA Nonlinear Differential Equations Appl. 23 (2016), no. 2, 23:20.
8. L.V. Hien, N.T. Dzung, H. Trinh, Stochastic stability of nonlinear discrete-time Markovian jump systems with time-varying delay and partially unknown transition rates, Neurocomputing 175 (2016), 450-458.
9. C.T. Anh, N.V. Thanh, Asymptotic behavior of the stochastic Kelvin–Voigt–Brinkman–Forchheimer equations, Stochastic Analysis and Applications 34 (2016), 441-455.
10. C.T. Anh, N.V. Thanh, Stabilization of a class of semilinear degenerate parabolic equations by Ito noise,  Random Operators and Stochastic Equations 24 (2016),  147–155.
11. C.T. Anh, B.K. My, Liouville-type theorems for elliptic inequalities involving the Δλ-Laplace operator, Complex Var. Elliptic Equ. 61 (2016), no. 7, 1002-1013.
12. L.V.Hien, H.Trinh, New finite-sum inequalities with applications to stability of discrete time-delay systems, Automatica 71 (2016), 197-201.
13. M.V. Thuan, H. Trinh, L.V. Hien, New inequality-based approach to passivity analysis of neural networks with interval time-varying delay, Neurocomputing 194 (2016), 301-307.
14. N.D. Binh, N.N. Thang, L.T. Thuy, Pullback Attractors for a Non-Autonomous Semilinear Degenerate Parabolic Equation on ℝ^N, Acta Mathematica Vietnamica 41 (2016), 183-199.
15. T.T. Anh, T.V. Nhung, L.V. Hien, On the existence and exponential attractivity of a unique positive almost periodic solution to an impulsive hematopoiesis model with delays. Acta Mathematica Vietnamica 41 (2016), 337-354.
16. C.T. Anh, P.T. Trang, Decay rate of solutions to 3D Navier-Stokes-Voigt equations in H^m spaces, Applied Mathematics Letters 61 (2016), 1-7.
17. Wei Yin Leong, Hieu Trinh, Le Van Hien, An LMI-based functional estimation scheme of large-scale time-delay systems with strong interconnections, Journal of the Franklin Institute 353 (2016), no. 11, 2482–2510.
18. Le Van Hien, Hieu Trinh, Stability analysis of two-dimensional Markovian jump state-delayed systems in the Roesser model with uncertain transition probabilities, Information Sciences 367-368 (2016), 403-417.
19. Le Van Hien, Nguyen Trung Dzung, Ha Binh Minh, A novel approach to state bounding for discrete-time Markovian jump systems with interval time-varying delay, IMA J. Math. Control Info. 33 (2016), 293-307.
20. Le Van Hien, Hieu Trinh, Stability of two-dimensional Roesser systems with time-varying delays via novel 2D finite-sum inequalities, IET Control Theory and Applications 10 (2016), 1665 – 1674.
21. N.T. Anh, T.D. Ke, N.N. Quan, Weak stability for integro-differential inclusions of diffusion-wave type involving infinite delays,  Discrete Contin. Dyn. Syst. Ser. B 21 (2016), 3637-3654.
22. Thanh Pham, Hieu Trinh, Le Van Hien, Kit Po Wong, Integration of Electric Vehicles for Load Frequency Output Feedback $\mathcal{H}_\infty$ Control of Smart Grids, IET Generation Transmission & Distribution 10 (2016), 3341-3352.
23. C. T. Kinh, L. V. Hien & T. D. Ke, Short-time behaviour analysis of fractional-order model of generalized pantograph-type neural networks, International Journal of Computer Mathematics: Computer Systems Theory, 1:3-4 (2016), 113-128, DOI:10.1080/23799927.2017.1281847.

2015

1. Le Van Hien, Doan Thai Son, Finite-time stability of a class of non-autonomous neural networks with heterogeneous proportional delays, Applied Mathematics and Computation 251 (2015), 14-23.
2. C.T. Anh and D.T. Son, Pullback attractors for non-autonomous 2D MHD equations in some unbounded domains, Ann. Pol. Math. 113 (2015), 129-154.
3. C.T. Anh and V.M. Toi, Null controllability for semilinear degenerate/singular parabolic equations,  Fixed Point Theory 16 (2015), No.1, 15-30.
4. N.T. Anh, T.D. Ke, Decay integral solutions for neutral fractional differential equations with infinite delays, Math. Methods Appl. Sci. 38(2015), No.8, 1601-1622.
5. T.D. Ke, N.V. Loi, V. Obukhovskii, Decay solutions for a class of fractional differential variational inequalities, Fract. Calc. Appl. Anal. 18 (2015), No.3, 531-553.
6. N.V. Dac, T.D. Ke, Pullback attractor for differential evolution inclusions with infinite delays, Appl. Math. Comput. 265 (2015), 667-680.
7. Le Van Hien, Le Huy Vu, Vu Ngoc Phat, Improved delay-dependent exponential stability of singular systems with mixed interval time-varying delays,  IET Control Theory & Applications 9 (9) (2015) 1364-1372.
8. Le Van Hien, Trung Dinh Tran, Hieu Minh Trinh, New H∞ control design for polytopic systems with mixed time-varying delays in state and input, International Journal of Innovative Computing, Information and Control, 11 (1) (2015) 105-123.
9. N.T.V. Anh, T.D. Ke, Asymptotic behavior of solutions to a class of differential variational inequalities, Ann. Polon. Math. 114 (2015), No. 2, 147-164.
10. Pham Trieu Duong, Mohamed Kainane Mozadek, Michael Reissig, Global existence for semi-linear structurally damped $\sigma$-evolution models, J. Math. Appl. Anal. 431 (2015), 569-596.
11. L.V. Hien, H. Trinh, An enhanced stability criterion for time-delay systems via a new bounding technique, Journal of the Franklin Institute 352 (2015), No.10, 4407–4422.
12. Le Van Hien, Hieu Trinh, Refined Jensen-based inequality approach to stability analysis of time-delay systems, IET Control Theory & Applications 9 (2015), no. 14, 2188-2194
13. L.V. Hien, V.N. Phat, H. Trinh, New generalized Halanay inequalities with applications to stability of nonlinear non-autonomous time-delay systems, Nonlinear Dynamics 82 (2015), no.1, 563-575.
14. H.V. Long, N.T.K. Son, H.T.T. Tam, Global existence of solutions to fuzzy partial hyperbolic functional differential equations with generalized Hukuhara derivatives, Journal of Intelligent & Fuzzy Systems 29 (2015), no.2, 939-954.
15. P.Q. Hung, D.A. Tuan, Liouville-type theorems for a quasilinear elliptic equation of the Hénon-type, NoDEA Nonlinear Differential Equations Appl.  22 (2015), no.6, 1817-1829.

2014

1. T.D. Ke, D. Lan, Decay integral solutions for a class of impulsive fractional differential equations in Banach spaces, Fract. Calc. Appl. Anal. 17:1 (2014), 96-121.
2. T.D. Ke, Controllability for semilinear functional differential equations without uniqueness, Electron. J. Differ. Equ. Vol. 2014 (2014), No. 36, pp. 1-15.
3. L.V. Hien, An explicit criterion for finite-time stability of linear nonautonomous systems with delays. Appl. Math. Lett. 30 (2014), 12-18.
4. Mouez Dimassi, Anh Tuan Duong, Trace asymptotics formula for the Schrödinger operators with constant magnetic fields, J. Math. Anal. Appl. 416 (2014), 427-448.
5. T.D. Ke and D. Lan, Global attractor for a class of functional differential inclusions with Hille-Yosida operators, Nonlinear Anal. 103 (2014), 72-86.
6. L.V. Hien, Global asymptotic behavior of positive solutions to a non-autonomous Nicholson’s blowflies model with delays, Journal of Biological Dynamics 8 (2014), 135-144.
7. L.V. Hien, T.T. Loan, B.T. Huyen Trang, H. Trinh, Existence and global asymptotic stability of positive periodic solution of delayed Cohen-Grossberg neural networks, Applied Mathematics and Computation 240 (2014), 200-212.
8. L.V. Hien, H. Trinh, A new approach to state bounding for linear time-varying systems with delay and bounded disturbances, Automatica 50:6 (2014), 1735–1738.
9. L.V. Hien, A novel approach to exponential stability of nonlinear non-autonomous difference equations with variable delays, Appl. Math. Lett. 38 (2014), 7-13.
10. C.T. Anh, N.D. Toan, Nonclassical diffusion equations on R^N with singularly oscillating external forces, Appl. Math. Lett. 38 (2014), 20-26.
11. C.T. Anh, N.D. Toan, Existence and upper semicontinuity of uniform attractors in H^1(R^N) for non-autonomous nonclassical diffusion equations, Ann. Polon. Math. 111 (2014), 271-295.
12. N.M. Chuong, T.D. Ke, N.N. Quan, Stability for a class of fractional partial integro-differential equations, J. Integral Equations Appl. 26 (2014), 145-170.
13. H. V. Long, N. T. K. Son, N. T. M. Ha, H. T. T. Tam,  Integral boundary value problem for fuzzy partial hyperbolic differential equations, Annals of Fuzzy Mathematics and Informatics 8 (2014) no. 3, 491-504.
14. C.T.Anh, T.D.Ke, On nonlocal problems for retarded fractional differential equations in Banach spaces, Fixed Point Theory 15 (2014), No.2, 373-392.
15. L.V. Hien, N.T. An, H. Trinh, New results on state bounding for discrete-time systems with interval time-varying delay and bounded disturbance inputs, IET Control Theory & Applications 8 (2014), No. 14, 1405-1414.
16. C.T. Anh, Global attractor for a semilinear strongly degenerate parabolic equation on R^N, Nonlinear Differ. Equ. Appl. NoDEA 21 (2014), No.5, 663-678.
17. H.V. Long, N.T.K. Son, N.T.M. Ha, L.H. Son, The existence and uniqueness of fuzzy solutions for hyperbolic partial differential equations, Fuzzy Optimization and Decision Making 13 (2014), No.4, 435-462.
18. H. V. Long, N. T. K. Son, N. T. M. Ha, H. T. T. Tam and B.C. Cuong, On the existence of fuzzy solutions for partial  hyperbolic functional differential equations, International Journal of Computational Intelligence Systems 7 (2014), No.6, 1159-1173.
19. M.V. Thuan, L.V. Hien, V.N. Phat, Exponential stabilization of non-autonomous delayed neural networks via Riccati equations, Applied Mathematics and Computation 246 (2014), 533–545.
20. C.T. Anh and N.D. Toan, Uniform attractors for non-autonomous nonclassical diffusion equations on R^N, Bull. Korean Math. Soc. 51 (2014), 1299-1324.
21. C.T. Anh, L.V. Hieu and D.T.P. Thanh, Global attractor for parabolic equations with infinite delay, Bull. Pol. Acad. Sci. Math. 62 (2014), 49-60.
22. T.D. Ke, C.T. Kinh, Generalized Cauchy problem involving a class of degenerate fractional differential equations, Dyn. Contin. Discrete Impulsive Syst. Ser. A Math. Anal. 21 (2014), no. 6, 449-472.
23. C.T. Anh and D.T. Son, Finite-dimensional pullback attractors for non-autonomous Newton-Boussinesq equations in some two-dimensional unbounded domains, Bull. Pol. Acad. Sci. Math. (2014), 265-289.

2013

1. C.T.Anh, P.T.Trang, On the 3D Kelvin–Voigt–Brinkman–Forchheimer equations in some unbounded domains. Nonlinear Anal. 89 (2013), 36-54.
2. C.T. Anh, L.V. Hieu and N.T. Huy, “Inertial manifolds for a class of non-autonomous semilinear parabolic equations with finite delay”, DCDS-A 33 (2013), 483-503
3. T. D. Ke, V. Obukhovskii, N.-C. Wong & J.-C. Yao. On a class of fractional order differential inclusions with infinite delays, Appl. Anal. 92 (2013), 115-137
4. Nguyen Manh Hung, Hoang Viet Long and Nguyen Thi Kim Son, ON THE ASYMPTOTICS OF SOLUTIONS TO THE SECOND INITIAL BOUNDARY VALUE PROBLEM FOR SCHRODINGER SYSTEMS IN DOMAINS WITH CONICAL POINTS, Appl. Math. 58:1 (2013), pp. 63-91
5. T.D. Ke, On the dynamics generated by a class of functional evolution inclusions, J. Math. Anal. Appl. 402 (2013), pp. 275-285
6. C.T. Anh and L.V. Hieu, Asymptotic behavior of retarded quasilinear parabolic equations,  Int. J. Evol. Equ. 6 (2013), 1-24
7. C.T. Anh and L.V. Hieu, Inertial manifolds for retarded second order in time evolution equations in admissible spaces,  Ann. Pol. Math. 108 (2013), 21-42
8. C.T. Anh and L.T. Thuy, Global attractors for a class of semilinear degenerate parabolic equations on R^n, Bull. Pol. Acad. Math. Sci. 61 (2013), 47-65
9. Cung The AnhTang Quoc BaoLe Thi Thuy Regularity and fractal dimension of pullback attractors for a non-autonomous semilinear degenerate parabolic equation. Glasg. Math. J. 55 (2013), no. 2, 431–448
10. Anh, Cung The; Quyet, Dao Trong; Tinh, Dao Thanh; Existence and finite time approximation of strong solutions to 2D g-Navier–Stokes equations. Acta Math. Vietnam. 38 (2013), no. 3, 413–428.
11. Anh, Cung The; Tuyet, Le Thi; Strong Solutions to a Strongly Degenerate Semilinear Parabolic Equation. Vietnam J. Math. 41 (2013), no. 2, 217–232.
12. C.T. Anh and D.T. Son, Pullback attractors for non-autonomous 2D Bernard problem in some unbounded domains, Math. Meth. Appl. Sci. 36 (2013),  1664-1684.
13. C.T. Anh and P.T. Trang, Pullback attractors for 3D Navier-Stokes-Voigt equations in some unbounded domainsProc. Royal Soc. Edinburgh  Sect. A 143 (2013), 223-251.
14. C.T. Anh and L.T. Tuyet, On a semilinear strongly degenerate parabolic equation in R^N,  J. Math. Sci. Univ. Tokyo 20 (2013),  91-113.
15. C.T. Anh and L.T. Thuy, Long-time behavior for semilinear degenerate parabolic equations on R^N, Commun. Korean Math. Soc28 (2013), 751-766.
16. C.T. Anh and V.M. Toi, Null controllability for a parabolic equation involving the Grushin operator in some multi-dimensional domains,  Nonlinear Anal.  93 (2013), 181-196.
17. N.M. Hung and N.T. Lien, On the solvability of the boundary value problem without initial condition for Schrödinger systems in infinite cylinders. Bound. Value Probl.2013, 2013:156,9 pp.
18. N.M. Hung and N.T. Anh, On initial-boundary value problems for hyperbolic equations in domains with conical points, Abstr. Appl. Anal. 2013, Art. ID 801314, 10 pp.
19. T.D. Ke, V. Obukhovskii, Controllability for systems governed by second-order differential inclusions with nonlocal conditions, Topol. Methods Nonlinear Anal. 42, No. 2, (2013), 377–403.
20. T.D. Ke, Cauchy problems for functional evolution inclusions involving accretive operators, Electron. J. Qual. Theory Differ. Equ. 2013, No. 75, 13 pp.
21. Fumihiko Hirosawa, Tanuhiko Inooka, Trieu Duong Pham: On the global solvability for the semilinear wave equations with smooth time dependent propagation speeds. 2013, M. Reissig, M. Ruzhansky (eds.), Progress in Partial Differential Equations, Springer Proceedings in Mathematics and Statistics 44, DOI:10.1007/978-3-319-00125-8_7.

2012

1. C.T. Anh and T. Q. Bao, Pullback attractors for generalized Korteweg-de Vries-Burgers equations, J. Math. Anal. Appl. 388 (2012), 899-912.
2.  C.T. Anh and D.T. Quyet, Long-time behavior for 2D non-autonomous g-Navier-Stokes equations, Ann. Pol. Math. 103 (2012), 277-302.
3. C.T. Anh and T.Q. Bao, Dynamics of non-autonomous nonclassical diffusion equations on R^N, Comm. Pure Appl. Anal.  11 (2012), 1231-1252.
4. C.T. Anh, N.D. Binh and L.T. Thuy, On uniform attractors for a class of non-autonomous degenerate parabolic equations, Int. J. Dyn. Sys. Diff. Equ. 4 (2012), 35-55, invited paper on special issue on “Degenerate and Singular Parabolic and Elliptic Equations”.
5. N.D. Binh and C.T. Anh, Attractors for parabolic equations related to Caffarelli-Kohn-Nirenberg inequalities, Boundary Value Problems 35 (2012), 1-33.
6. C.T. Anh and L.V. Hieu, Existence and uniform asymptotic stability for parabolic equations with infinite delay, Electron. J. Differ. Equ.  51 (2012), 1-14.
7. T.D.Ke, V. Obukhovskii, N.-C. Wong, J.-C. Yao. Approximate controllability for systems governed by nonlinear Volterra type equations, Differ. Equ. Dyn. Syst.  20:1 (2012), pp. 35-52.
8. Tran Dinh Ke, Valeri Obukhovskii, Ngai-Ching Wong and Jen-Chin Yao. On  semilinear integro-differential equations with nonlocal conditions in Banach spaces,  Abstr. Appl. Anal. 2012, Art. ID 137576, 26 pp.
9. N.M. Chuong, T.D. Ke, Generalized Cauchy problem involving nonlocal and impulsive conditions, J. Evol. Equ. 12 (2012), 367-392.
10. H. V. Long and N. T. K. Son, Second initial boundary value problem for strongly Schrodinger systems in cylinders with nonsmooth base, Pan-Amer. Math. J., 22 (2012), No 3, 1–29.
11. C.T. Anh and D.T. Quyet, “g-Navier-Stokes equations with infinite delays”, Vietnam J. Math. 40 (2012), 57-78
12. C.T. Anh and N.D. Toan, “Pullback attractors for nonclassical diffusion equations in non-cylindrical domains”,Int. J. Math. Math. Sci. (2012), 24 p
13. C.T. Anh and V.M. Toi, “Attractors for a semilinear parabolic system involving the Grushin operator”,  J. Abstract Diff. Equ. Appl. 3:2(2012), 1-16
14. C.T. Anh and L.V. Hien, “Exponential stability of solutions to semilinear parabolic equations with delays”, Taiwanese J. Math. 16 (2012), 2133-2151
15. C.T. Anh and L.V. Hieu, “Attractors for non-autonomous semilinear parabolic equations with delays”, Acta Math. Viet. 37 (2012), 357-377
16. C.T. Anh, T.Q. Bao and N.V. Thanh, “Regularity of random attractors for stochastic semilinear degenerate parabolic equations”, EJDE 207 (2012), 1-22

2011

1.  C. T. Anh and T. Q. Bao, Pullback attractors for parabolic equations involving weighted p-Laplacian operators, Ann. Pol. Math. 101 (2011), 1-19.
2.  C. T. Anh and V. M. Toi, On the dynamics of non-autonomous parabolic systems  involving Grushin operators, Int. J. Math. Math(2011), Article ID 178057, 27 p.
3.  C. T. Anh and T. T. H. Yen, Finite-dimensional pullback attractors for parabolic equations with Hardy type potentials, Ann. Pol. Math. 102 (2011), 161-186.
4. T. D. Ke and N.-C. Wong. Long-time behaviour for a model of porous-medium equations with variable coefficients, Optimization 60 (2011) 6, pp. 709-724.
5. T.D.Ke, V. Obukhovskii, N.-C. Wong, J.-C. Yao, An abstract Cauchy problem for higher order differential inclusions with infinite delay, Discuss. Math. Differ. Incl. Control Optim. 31:2 (2011 ) 199–229.
6. L.V. Hien, Robust exponential stability of neutral systems with nondifferentiable interval time – varying delays and polytopic uncertainties. Adv. Dyn. Syst. Appl., 6(2011), 185 – 198.
7. L.V. Hien and V.N. Phat, New exponential estimate for robust stability of nonlinear neutral time-delay systems with convex polytopic uncertainties. J. Nonlinear Conv. Anal., 12(2011), 541 – 552.
8. L.V.Hien, T.T. Anh and V.N. Phat, Stability analysis for linear non-autonomous systems with continuously distributed multiple time-varying delays and applications. Acta Math. Viet., 36(2011), 129 – 143.

2010

1. P. T. Duong, Boundary value problem for a parabolic system in a domain with a conical point on the boundary, Differential Equations, 2010, Vol. 46, No. 2, pp. 294–298.
2. C. T. Anh, On the Boussinesq/Full dispersion systems and Boussinesq/Boussinesq systems for internal waves, Nonlinear Anal. 72 (2010), 409-429.
3. C. T. Anh, N. M. Chuong and T. D. Ke, Global attractor for the m-semiflow generated by a quasilinear parabolic equation, J. Math. Anal. Appl. 363 (2010), 444-453.
4. C. T. Anh and T. D. Ke, On quasilinear parabolic equations involving weighted p-Laplacian operators, NoDEA 17: 2 (2010), 195-212.
5. C. T. Anh, N. D. Binh and L. T. Thuy, On the global attractors for a class of semilinear degenerate parabolic equations, Ann. Pol. Math. 98:1 (2010), 71-89.
6. C. T. Anh, Pullback attractors for non-autonomous parabolic equations involving Grushin operator, EJDE 11 (2010), 1-14.
7. C. T. Anh, L.V. Hieu and T. T. Loan, Global attractors for semilinear parabolic equations with delay, Int. J. Evol. Equations 5:1 (2010), 1-18.
8. C. T. Anh and T. Q. Bao, Pullback attractors for a class of non-autonomous nonclassical diffusion equations, Nonlinear Anal. 73 (2010), 399-412.
9. C. T. Anh and N. D. Binh, Attractors for a non-autonomous parabolic equation without uniqueness, Int. J. Diff. Equ. (2010), Article ID 103510, 17 p.
10. C. T. Anh and N. V. Quang, Uniform attractors for non-autonomous parabolic equations involving weighted p-Laplacian operators, Ann. Pol. Math. 98:3 (2010), 251-271.
11. C. T. Anh and T. Q. Bao, Pullback attractor for a non-autonomous semilinear degenerate parabolic equation,  Glasgow Math. J52 (2010), 537-554.
12. N. M. Hung and C. T. Anh, On the first initial boundary value problem for Schrodinger systems in domains with conical points, Differential Equations 46:2 (2010), 289-293.
13. L. V. Hien, Exponential stability and stabilization of fuzzy time varying delay systems, International Journal of  Systems Science, Vol. 41 (2010).
14. L. V. Hien, Exponential stability of linear uncertain polytopic systems with distributed time varying delays, Differential Equations and Control Processes, Vol. 2010, No. 2.
15. L. V. Hien and V. N. Phat, New stability analysis for linear time-varying systems with mixed multiple delays and applications, IMA Journal of Applied Mathematics, Vol. 75 (2010).
16. T. D. Ke and N. C. Wong, Asymptotic behavior for  retarded parabolic equations with superliner perturbations, J. Optim. Theory. Appl. 146 (2010), 117-135.
17. Pham Trieu Duong, Do Van Loi. Existence of weak solutions for mixed problems of parabolic systems. Electron. J. Diff. Equ., Vol. 2010(2010), No. 83, pp. 1-7.

2009

1. N. M. Hung  and J. C. Yao, Cauchy- Dirichlet problem for second-order hyperbolic equations in cylinder with non-smooth base, Nonlinear Analysis, 70 (2009), 741-756.
2. N. M. Hung  and J. C. Yao, On the asymptotic of solutions of the first initial boundary value problem for hyperbolic systems in infinite cylinders with base containing conical points, Nonlinear Analysis, 71 (2009), 1620-1635.
3. N. M. Hung and N. T. Anh, Asymptotics of solutions of parameter-depending elliptic boundary value  problems  in domains with conical points, Elec. J. of Diff. Eq. 2009: 125 (2009), 1-21.
4. N. M. Hung, V. T. Luong, Lp-regularity of solutions to first initial-boundary value problem for hyperbolic equations in cusp domains, Elec. J. of Diff. Eq., 2009: 151 (2008), 1-18.
5. N. M. Hung, V. T. Luong, Regularity of the solution of the first initial-boundary value problem for hyperbolic equations in domains with cuspidal points on boundary, Boundary Value Problems, (2009), Art. ID 135730, 14 pp.
6. N. M. Hung and N. T. K. Son, On the regularity of solution of the second initial boundary value problem for Schrodinger systems in domains with conical points, Taiwanese Journal of Mathematics, Vol. 13, No. 6B, December 2009, pp. 1885-1907.
7. N. M. Hung, T. X. Tiep and N. T. K. Son, Cauchy-Neumann problem for second-order general Schrodinger equations in cylinders with non-smooth bases, Boundary Value Problems, Vol. 2009, Article ID 231802, pp. 1-13.
8. N. M. Hung and B. T. Kim, Asymptotic behavior of solutions to Cauchy-Dirichlet problems for second-order hyperbolic equations in cylinder with non-smooth base, Elec. J. of Diff. Eq., 2009: 36, 1- 16.
9. C. T. Anh and T. D. Ke, Existence and continuity of global attractors for a degenerate parabolic equation, EJDE 61 (2009), 1-13.
10. C. T. Anh and T. D. Ke, Long-time behavior for quasilinear parabolic equations involving weighted p-Laplacian operators, Nonlinear Anal. 71 (2009), 4415-4422.
11. C. T. Anh, Derivation and well-posedness of Boussinesq/Boussinesq systems for internal waves, Ann. Pol.  Math. 96: 2 (2009), 127 -161.
12. C. T. Anh, Influence of surface tension and bottom topography on internal waves, M3AS 19:12 (2009), 2145-2175.
13. N. M. Hung and C.T. Anh, Asymptotic expansions of solutions of the first initial boundary value problem for Schrodinger system in domains with conical points II,  Ukrain. Math. Zh. 61 (2009), 1640-1659.
14. L. V. Hien and V. N. Phat, Exponential stabilization for a class of hybrid systems with mixed delays in state and control, Nonlinear Analysis: Hybrid Systems, Vol. 3, (2009), 259 – 265.
15. L. V. Hien and V.N. Phat, Exponential stability and stabilization of a class of uncertain linear time – delay systems, Journal of The Franklin Institute, Vol. 346 (2009), 611- 625.
16. L. V. Hien, Q. P. Ha and V. N. Phat, Stability and stabilization of switched linear dynamic systems with time delay and uncertainties, Applied Mathematics and Computation, Vol. 210 (2009), 223 – 231.
17. L. V. Hien and V. N. Phat, An application of Razumikhin theorem to exponential stability for linear non-autonomous systems with time-varying delay, Applied Mathematics Letters, Vol. 22 (2009), 1412 – 1417.
18. L. V. Hien and V. N. Phat, Delay feedback control in exponential stabilization of linear time-varying systems with input delay, IMA Journal of Mathematical Control and Information, Vol. 26 (2009), 163 – 177.
19. L. V. Hien, Exponential stability of switched systems with mixed time delay, Applied Mathematical Science, Vol. 3 (2009), 2481 – 2489.
20. L. V. Hien, Delay-dependent exponential stability of linear systems with fast time-varying delay, International Mathematical Forum, Vol. 4 (2009), 1939 – 1947.
21. Chiara Andra, Pham Trieu Duong. Learning statistical concepts with Ti-Nspire. Quaderno N.16/2009. Quaderni Scientifici del Dipartimento di Matematica. University of Turin.

2008

1. N. M. Hung and N. T. Anh, Regularity of solutions of initial boundary value problems  for parabolic equations in domains with conical points, J. Diff. Eq., 245 (2008), 1801-1818.
2. N. M. Hung and N. T. Anh, Regularity of solution of the second initial boundary value problem for parabolic equations in domains with conical points, Proc. of Voronezh State Univ. No. 1 (2008), 170-178.
3. N. M. Hung and N. T. Anh, The Cauchy-Neumann problem for parabolic equations in domains with conical point, Taiwanese J. of Math. 12:7 (2008), 1620-1635.
4. N. M. Hung and V. T. Luong, Unique solvbility of initial boundary – value problems for hyperbolic systems in cylinders whose base is a cusp domain, Elec. J. of Diff. Eq., 138 (2008), 1-10.
5. N. M. Hung and N. T. K. Son, Existence and smoothness of solutions to second initial boundary value problems for Schrodinger systems in cylinders with non-smooth bases, Electronic Journal of Differential Equations, Vol. 2008(2008), No.35, pp. 1-14.
6. N. M. Hung and N. T. K. Son, Asymptotic expansions of solutions to the Cauchy-Neumann problem for Schrodinger systems in domains with conical points,  International Journal of Evolution Equations, Vol. 4, No. 2 (2008), pp. 157-176.
7. N. M. Hung and B. T. Kim, On the solvability of the first mixed problem for strongly hyperbolic system in infinite nonsmooth cylinders, Taiwanese J. of Math. 12: 9 (2008), 2601-2618.
8. L. V. Hien, T. T. Loan and D. A. Tuan, Periodic solutions and exponential stability for shunting inhibitory cellular neural networks with continuously distributed delays, Electronic J. Dif. N. 7 (2008), 1-10.
9. T. T. Loan and D. A. Tuan, Global exponential stability of a class of neural networks with unbounded delays, Ucrain Math. J., 60(10) (2008), 1401-1413.
10. C. T. Anh, P. Q. Hung, T. D. Ke and T. T. Phong, Global attractor for a semilinear parabolic equation involving Grushin operator, EJDE 32 (2008), 1-11.
11.  C. T. Anh and P. Q. Hung, Global existence and long-time behavior of solutions to a class of degenerate parabolic equations, Ann. Pol. Math. 93 (3) (2008), 217-230.
12. L. V. Hien and H. V. Thi, Exponential stabilization of linear systems with mixed delays in state and control, Differential Equations and Control Processes, Vol. 2008, No. 4, 32 – 42.

2007

1.  N. D. Huy and J. Stara, On existence and Schauder regularity  of solutions to a class of generalized stationary Stokes problem. Proceedings of Equadiff-11(2007), pp. 123–133 , ISBN 978-80-227-2624-5.
2. L. V. Hien, Q. P. Ha and V. N. Phat, Exponential stability for a class of uncertain linear hybrid time-delay systems and applications, in Proc. The Eighth  Inter. Conf. Intelligent Technologies,Sydney,Australia, 12 – 14 Dec. 2007, 275 – 280.

2006

1. N. D. Huy, J. Stara, On existence and regularity of solutions to a class of generalized stationary Stokes problem, Comm. Math.Univ. Carolin. 47 (2006), no. 2, 241-264.
2.  N. D. Huy, J. Stara, Fluids with pressure dependent viscosity: partial regularity of steady flows up to the boundary, Preprint No. MATH-KMA-2006/204CharlesUniversity.
3. N. M. Hung and C. T. Anh, On the smoothness of solutions of the first initial boundary value problem for Schrodinger systems in infinite cylinders, South. Asian Bull. Math. 30: 3 (2006), 461 – 471.
4. L. V. Hien, Exponential stability of fuzzy differential equations, Southeast Asian Bulletin of Mathematics, Vol. 30 (2006), 835 – 842.

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