Dynamics of laminated Timoshenko beams B Feng, TF Ma, RN Monteiro, CA Raposo Journal of Dynamics and Differential Equations 30, 1489-1507, 2018 | 67 | 2018 |
Optimal decay for a porous elasticity system with memory B Feng, TA Apalara Journal of Mathematical Analysis and Applications 470 (2), 1108-1128, 2019 | 63 | 2019 |
Decay of solutions for a one-dimensional porous elasticity system with memory: the case of non-equal wave speeds B Feng, M Yin Mathematics and Mechanics of Solids 24 (8), 2361-2373, 2019 | 56 | 2019 |
Well‐posedness and exponential decay for laminated Timoshenko beams with time delays and boundary feedbacks B Feng Mathematical Methods in the Applied Sciences 41 (3), 1162-1174, 2018 | 53 | 2018 |
Long-time dynamics for a nonlinear Timoshenko system with delay B Feng, XG Yang Applicable Analysis 96 (4), 606-625, 2017 | 50 | 2017 |
Global well‐posedness and exponential stability results of a class of Bresse‐Timoshenko‐type systems with distributed delay term A Choucha, D Ouchenane, K Zennir, B Feng Mathematical Methods in the Applied Sciences 47 (13), 10668-10693, 2024 | 42 | 2024 |
Global Well‐Posedness and Stability for a Viscoelastic Plate Equation with a Time Delay B Feng Mathematical Problems in Engineering 2015 (1), 585021, 2015 | 39 | 2015 |
Uniform decay of energy for a porous thermoelasticity system with past history B Feng Applicable Analysis 97 (2), 210-229, 2018 | 31 | 2018 |
Well-posedness and exponential stability for a plate equation with time-varying delay and past history B Feng | 31 | 2017 |
Uniform attractors for a non-autonomous viscoelastic equation with a past history Y Qin, B Feng, M Zhang Nonlinear Analysis: Theory, Methods & Applications 101, 1-15, 2014 | 31 | 2014 |
On a semilinear Timoshenko-Coleman-Gurtin system: quasi-stability and attractors B Feng Discrete Contin. Dyn. Syst 37 (9), 4729-4751, 2017 | 30 | 2017 |
Memory-type boundary control of a laminated Timoshenko beam B Feng, A Soufyane Mathematics and Mechanics of Solids 25 (8), 1568-1588, 2020 | 29 | 2020 |
On a thermoelastic laminated Timoshenko beam: well posedness and stability B Feng Complexity 2020 (1), 5139419, 2020 | 29 | 2020 |
Exponential stability for a thermoelastic laminated beam with nonlinear weights and time-varying delay C Nonato, C Raposo, B Feng Asymptotic Analysis 126 (1-2), 157-185, 2022 | 27 | 2022 |
Global existence and exponential stability for a nonlinear Timoshenko system with delay B Feng, ML Pelicer Boundary Value Problems 2015, 1-13, 2015 | 27 | 2015 |
On the decay rates for a one-dimensional porous elasticity system with past history. B Feng Communications on Pure & Applied Analysis 18 (6), 2019 | 25 | 2019 |
Global and exponential attractors for a nonlinear porous elastic system with delay term. MJD Santos, B Feng, DSA Júnior, ML Santos Discrete & Continuous Dynamical Systems-Series B 26 (5), 2021 | 23 | 2021 |
General Decay for a Viscoelastic Wave Equation with Density and Time Delay Term in ℝ𝑛 B Feng Taiwanese Journal of Mathematics 22 (1), 205-223, 2018 | 21 | 2018 |
A new scenario for stability of nonlinear Bresse‐Timoshenko type systems with time dependent delay B Feng, DS Almeida, MJ Dos Santos, LG Rosário Miranda ZAMM‐Journal of Applied Mathematics and Mechanics/Zeitschrift für Angewandte …, 2020 | 20 | 2020 |
General decay for a viscoelastic wave equation with strong time-dependent delay B Feng Boundary value problems 2017, 1-11, 2017 | 19 | 2017 |