Existence and uniform decay for a non-linear viscoelastic equation with strong damping MM Cavalcanti, VND Cavalcanti, J Ferreira Mathematical methods in the applied sciences 24 (14), 1043-1053, 2001 | 420 | 2001 |
Exponential stability for the Timoshenko system with two weak dampings CA Raposo, J Ferreira, ML Santos, NNO Castro Applied Mathematics Letters 18 (5), 535-541, 2005 | 258 | 2005 |
On a class of problems involving a nonlocal operator FJSA Corrêa, SDB Menezes, J Ferreira Applied Mathematics and Computation 147 (2), 475-489, 2004 | 122 | 2004 |
Global existence and stability for wave equation of Kirchhoff type with memory condition at the boundary ML Santos, J Ferreira, DC Pereira, CA Raposo Nonlinear Analysis: Theory, Methods & Applications 54 (5), 959-976, 2003 | 71 | 2003 |
On the general decay of a nonlinear viscoelastic plate equation with a strong damping and p⃗ (x, t)-Laplacian J Ferreira, SA Messaoudi Nonlinear Analysis: Theory, Methods & Applications 104, 40-49, 2014 | 41 | 2014 |
A reaction–diffusion model for the non-local coupled system: existence, uniqueness, long-time behaviour and localization properties of solutions RMP Almeida, SN Antontsev, JCM Duque, J Ferreira IMA Journal of Applied Mathematics 81 (2), 344-364, 2016 | 34 | 2016 |
Existence, uniqueness and blowup for hyperbolic equations with nonstandard growth conditions S Antontsev, J Ferreira Nonlinear Analysis: Theory, Methods & Applications 93, 62-77, 2013 | 34 | 2013 |
Existence and blow up of solutions for a strongly damped Petrovsky equation with variable-exponent nonlinearities S Antontsev, J Ferreira, E Piskin Texas State University, Department of Mathematics, 2021 | 32 | 2021 |
Global solvability of a mixed problem for a nonlinear hyperbolic-parabolic equation in noncylindrical domains J Ferreira, NA Lar'kin Portugaliae mathematica 53 (4), 381-396, 1996 | 32 | 1996 |
Existence and uniform decay for a nonlinear beam equation with nonlinearity of Kirchhoff type in domains with moving boundary ML Santos, J Ferreira, CA Raposo Abstract and Applied Analysis 2005, 901-919, 2005 | 31 | 2005 |
The Crank–Nicolson–Galerkin finite element method for a nonlocal parabolic equation with moving boundaries RMP Almeida, JCM Duque, J Ferreira, RJ Robalo Numerical Methods for Partial Differential Equations 31 (5), 1515-1533, 2015 | 30 | 2015 |
Blow up and asymptotic behavior of solutions for ap (x)-Laplacian equation with delay term and variable exponents S Antontsev, J Ferreira, E Piskin, H Yuksekkaya, M Shahrouzi Electronic Journal of Differential Equations 2021 (01-104), 84-20, 2021 | 27 | 2021 |
The Euler–Galerkin finite element method for a nonlocal coupled system of reaction–diffusion type JCM Duque, RMP Almeida, SN Antontsev, J Ferreira Journal of Computational and Applied Mathematics 296, 116-126, 2016 | 26 | 2016 |
On hyperbolic–parabolic equations with nonlinearity of Kirchhoff–Carrier type in domains with moving boundary R Benabidallah, J Ferreira Nonlinear Analysis: Theory, Methods & Applications 37 (3), 269-287, 1999 | 26 | 1999 |
A reaction–diffusion model for a class of nonlinear parabolic equations with moving boundaries: Existence, uniqueness, exponential decay and simulation RJ Robalo, RMP Almeida, M do Carmo Coimbra, J Ferreira Applied Mathematical Modelling 38 (23), 5609-5622, 2014 | 25 | 2014 |
A global attractor for a nonlocal parabolic problem J Simsen, J Ferreira Nonlinear Stud 21 (3), 405-16, 2014 | 23 | 2014 |
Existence and non-existence of solutions for Timoshenko-type equations with variable exponents SN Antontsev, J Ferreira, E Pişkin, SMS Cordeiro Nonlinear Analysis: Real World Applications 61, 103341, 2021 | 19 | 2021 |
On global solvability and asymptotic behaviour of a mixed problem for a nonlinear degenerate Kirchhoff model in moving domains R Benabidallah, MM Cavalcanti, VND Cavalcanti, J Ferreira Bulletin of the Belgian Mathematical Society-Simon Stevin 10 (2), 179-196, 2003 | 19 | 2003 |
Parabolic reaction-diffusion systems with nonlocal coupled diffusivity terms J Ferreira, HB de Oliveira Discrete and Continuous Dynamical Systems-Series A 37 (5), 2431-2453, 2017 | 17 | 2017 |
Reproductive weak solutions of magneto-micropolar fluid equations in exterior domains M Durán, J Ferreira, MA Rojas-Medar Mathematical and computer modelling 35 (7-8), 779-791, 2002 | 17 | 2002 |