Font Size: a A A
Keyword [geometric singular perturbation theory]
Result: 1 - 20 | Page: 1 of 2
1. Travelling Waves For A Generalized Fisher Equation With The Higher Order Terms As Perturbations
2. Existence Of Traveling Wavefronts For Reaction Diffusion Equation With Distributed Delay
3. Existence Of Travelling Waves With Strong Generic Kernel In A Vector-Disease Model
4. The Study Of Dynamic Transitions And Time-delay Effects In Slow-fast Hindmarsh-rose System With Method Of Geometric Singular Perturbation
5. The Study Of The Traveling Wave Solutions Of Three Kinds Of Nonlinear Wave Equations
6. The Existence Of Traveling Wave Solutions For Three Generalized KdV Equations
7. With Time Delay The Spread Of The Existence Of Solutions In The Musca Domestica Flies Model Wave
8. Research On The Applications Of Geometric Singular Perturbation Theory
9. Periodic Solutions And Homoclinic And Heteroclinic Solutions In Several Singularly Perturbed Systems
10. Traveling Front Solutions Of Several Singularly Perturbed Reaction-diffusion Equations
11. Stability Loss Delay In Slow-fast Systems And Dynamics Of Population Models
12. The Existence And Asymptotic Behavior Of Traveling Wave Solutions For Two Types Of Evolution Equations
13. The Existence Of Traveling Wave Solutions And Solitary Wave Solutions For Some Higher Order KdV Equations And Reaction-diffusion Equations
14. Geometric Singular Perturbation Analysis Of Several Slow-fast Systems
15. Steady-State Solution Of One-Dimensional Poisson-Nernst-Planck Model With Permanent Charge And Its Applications In Ion Channels
16. Research On Several Time-delay Slow-fast Predator-prey Dynamics Models
17. Traveling Wave Solutions In Several Singularly Perturbed Reaction-advection-diffusion Systems
18. Study Of The Existence Of Traveling Wave Solutions For A Perturbed Combined Double-Dispersive Equation And A Keller-Segel Equation
19. Global Analysis Of A Predator-prey System With Harvesting
20. Researches On Bifurcation And Nonlinear Waves In Several Singularly Perturbed Systems
  <<First  <Prev  Next>  Last>>  Jump to