Normal forms for retarded functional differential equations with parameters and applications to Hopf bifurcation T Faria, LT Magalhães Journal of differential equations 122 (2), 181-200, 1995 | 495 | 1995 |
Normal forms for retarded functional differential equations and applications to Bogdanov-Takens singularity T Faria, LT Magalhães Journal of differential equations 122 (2), 201-224, 1995 | 369 | 1995 |
Stability and bifurcation for a delayed predator–prey model and the effect of diffusion T Faria Journal of Mathematical Analysis and Applications 254 (2), 433-463, 2001 | 324 | 2001 |
Normal forms and Hopf bifurcation for partial differential equations with delays T Faria Transactions of the American Mathematical Society 352 (5), 2217-2238, 2000 | 267 | 2000 |
Travelling waves for delayed reaction–diffusion equations with global response T Faria, W Huang, J Wu Proceedings of the Royal Society A: Mathematical, Physical and Engineering …, 2006 | 179 | 2006 |
Nonmonotone travelling waves in a single species reaction–diffusion equation with delay T Faria, S Trofimchuk Journal of Differential Equations 228 (1), 357-376, 2006 | 142 | 2006 |
On a planar system modelling a neuron network with memory T Faria Journal of Differential Equations 168 (1), 129-149, 2000 | 111 | 2000 |
Synchronization and stable phase-locking in a network of neurons with memory J Wu, T Faria, YS Huang Mathematical and Computer Modelling 30 (1-2), 117-138, 1999 | 101 | 1999 |
Smoothness of center manifolds for maps and formal adjoints for semilinear FDEs in general Banach spaces T Faria, W Huang, J Wu SIAM Journal on Mathematical Analysis 34 (1), 173-203, 2002 | 81 | 2002 |
Normal forms for semilinear functional differential equations in Banach spaces and applications. Part II T Faria Discrete and Continuous Dynamical Systems 7 (1), 155-176, 2001 | 71 | 2001 |
Local and global stability for Lotka–Volterra systems with distributed delays and instantaneous negative feedbacks T Faria, JJ Oliveira Journal of Differential Equations 244 (5), 1049-1079, 2008 | 56 | 2008 |
Persistence, Permanence and Global Stability for an -Dimensional Nicholson System T Faria, G Röst Journal of Dynamics and Differential Equations 26 (3), 723-744, 2014 | 47 | 2014 |
Global asymptotic behaviour for a Nicholson model with patch structure and multiple delays T Faria Nonlinear Analysis: Theory, Methods & Applications 74 (18), 7033-7046, 2011 | 42 | 2011 |
Periodic solutions for a non-monotone family of delayed differential equations with applications to Nicholson systems T Faria Journal of Differential Equations 263 (1), 509-533, 2017 | 41 | 2017 |
Stability of periodic solutions arising from Hopf bifurcation for a reaction-diffusion equation with time delay T Faria, W Huang Differential equations and dynamical systems (Lisbon, 2000) 31, 125-141, 2002 | 36 | 2002 |
Asymptotic stability for delayed logistic type equations T Faria Mathematical and computer modelling 43 (3-4), 433-445, 2006 | 35 | 2006 |
Positive travelling fronts for reaction–diffusion systems with distributed delay T Faria, S Trofimchuk Nonlinearity 23 (10), 2457, 2010 | 31 | 2010 |
Stability results for impulsive functional differential equations with infinite delay T Faria, MC Gadotti, JJ Oliveira Nonlinear Analysis: Theory, Methods & Applications 75 (18), 6570-6587, 2012 | 30 | 2012 |
General criteria for asymptotic and exponential stabilities of neural network models with unbounded delays T Faria, JJ Oliveira Applied mathematics and computation 217 (23), 9646-9658, 2011 | 30 | 2011 |
Realisation of ordinary differential equations by retarded functional differential equations in neighbourhoods of equilibrium points T Faria, LT Magalhães Proceedings of the Royal Society of Edinburgh Section A: Mathematics 125 (4 …, 1995 | 30 | 1995 |