Add to ORKGConsider the following FitzHugh-Nagumo type equation ut = uxx + f(u,w), wt = g(u,w) where f(u,w) = u(u − a(w))(1 − u) for some smooth function a(w) and g(u,w) = u − w. By allowing a(w) to cross zero and one, the corresponding traveling wave equation possesses special turning points which result in very rich dynamics. In this work, we examine the existence of fronts, backs and pulses solutions; in particular, the co-existence of different fronts will be discussed
This thesis considers solutions to the discrete Nagumo equation u˙ n = d(un−1 − 2un + un+1) + f(un),...
We use geometric singular perturbation techniques combined with an action functional approach to stu...
It is known that the FitzHugh–Nagumo equation possesses fast and slow travelling waves. Fast waves a...
AbstractConsider the following FitzHugh–Nagumo type equationut=uxx+f(u,w),wt=ϵg(u,w), where f(u,w)=u...
AbstractIn this work we consider the diversity of traveling wave solutions of the FitzHugh–Nagumo ty...
Abstract. In this paper we consider travelling wave solutions of the FitzHugh-Nagumo equations vt = ...
99學年度楊定揮教師升等參考著作[[abstract]]In this work we consider the diversity of traveling wave solutions of th...
ABSTRACT Algorithms are proposed to calculate traveling pulses and fronts in both directions for the...
In this article, existence and stability of N-front travelling wave solutions of partial differentia...
It is known that the FitzHugh-Nagumo equation possesses fast and slow travelling waves. Fast waves a...
In this dissertation we consider traveling wave solutions of the FitzHugh-Nagumo equations, [special...
Algorithms are constructed to calculate standing pulse and traveling wave solu- tions for the FitzHu...
The FitzHugh-Nagumo equations are known to admit fast traveling pulses that have monotone tails and ...
We consider traveling wave front solutions for the diffusive Nicholson's blowflies equation on ...
In this paper we study the existence of one-dimensional travelling wave solutions u(x, t) = phi(x - ...
This thesis considers solutions to the discrete Nagumo equation u˙ n = d(un−1 − 2un + un+1) + f(un),...
We use geometric singular perturbation techniques combined with an action functional approach to stu...
It is known that the FitzHugh–Nagumo equation possesses fast and slow travelling waves. Fast waves a...
AbstractConsider the following FitzHugh–Nagumo type equationut=uxx+f(u,w),wt=ϵg(u,w), where f(u,w)=u...
AbstractIn this work we consider the diversity of traveling wave solutions of the FitzHugh–Nagumo ty...
Abstract. In this paper we consider travelling wave solutions of the FitzHugh-Nagumo equations vt = ...
99學年度楊定揮教師升等參考著作[[abstract]]In this work we consider the diversity of traveling wave solutions of th...
ABSTRACT Algorithms are proposed to calculate traveling pulses and fronts in both directions for the...
In this article, existence and stability of N-front travelling wave solutions of partial differentia...
It is known that the FitzHugh-Nagumo equation possesses fast and slow travelling waves. Fast waves a...
In this dissertation we consider traveling wave solutions of the FitzHugh-Nagumo equations, [special...
Algorithms are constructed to calculate standing pulse and traveling wave solu- tions for the FitzHu...
The FitzHugh-Nagumo equations are known to admit fast traveling pulses that have monotone tails and ...
We consider traveling wave front solutions for the diffusive Nicholson's blowflies equation on ...
In this paper we study the existence of one-dimensional travelling wave solutions u(x, t) = phi(x - ...
This thesis considers solutions to the discrete Nagumo equation u˙ n = d(un−1 − 2un + un+1) + f(un),...
We use geometric singular perturbation techniques combined with an action functional approach to stu...
It is known that the FitzHugh–Nagumo equation possesses fast and slow travelling waves. Fast waves a...