AbstractPhase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusion systems is developed. By locally approximating the isochrons of the limit-cycle orbit, we derive the phase sensitivity function, which is a key quantity in the phase description of limit cycles. As an example, synchronization of traveling pulses in a pair of mutually interacting reaction-diffusion systems is analyzed. It is shown that the traveling pulses can exhibit multi–modal phase locking
The thesis is on the limit cycle in nonlinear dynamics systems. To begin, I mention a nonlinear syst...
The influence of global inhibition on travelling pulses both in infinite and in finite periodic syst...
ilhorst, Logak and Nishiura [10] and to Chen, Hilhorst and Logak [4] for the application of similar ...
Abstract Phase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusi...
AbstractPhase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusio...
Reaction-diffusion systems can describe a wide class of rhythmic spatiotemporal patterns observed in...
In this thesis, the existence and stability of pulse solutions in two-component, singularly perturbe...
A unified approach for analyzing synchronization in coupled systems of autonomous differential equat...
We introduce a new mathematical framework for the qualitative analysis of dynamical stability, desig...
The statistical properties of a one-dimensional reaction-diffusion system undergoing a Hopf bifurcat...
Abstract: This paper is concerned with the global stability of limit cycle oscillations for a partic...
A theory is developed for local, first-order sensitivity analysis of limit-cycle oscillating hybrid ...
Abstract. Rhythmic behaviors in neural systems often combine features of limit-cycle dynamics (stabi...
The coexistence of two stable limit cycles exhibiting different periods is examined for a nonlinear ...
This paper investigates a reaction-diffusion system modeling three competing species, with diffusion...
The thesis is on the limit cycle in nonlinear dynamics systems. To begin, I mention a nonlinear syst...
The influence of global inhibition on travelling pulses both in infinite and in finite periodic syst...
ilhorst, Logak and Nishiura [10] and to Chen, Hilhorst and Logak [4] for the application of similar ...
Abstract Phase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusi...
AbstractPhase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusio...
Reaction-diffusion systems can describe a wide class of rhythmic spatiotemporal patterns observed in...
In this thesis, the existence and stability of pulse solutions in two-component, singularly perturbe...
A unified approach for analyzing synchronization in coupled systems of autonomous differential equat...
We introduce a new mathematical framework for the qualitative analysis of dynamical stability, desig...
The statistical properties of a one-dimensional reaction-diffusion system undergoing a Hopf bifurcat...
Abstract: This paper is concerned with the global stability of limit cycle oscillations for a partic...
A theory is developed for local, first-order sensitivity analysis of limit-cycle oscillating hybrid ...
Abstract. Rhythmic behaviors in neural systems often combine features of limit-cycle dynamics (stabi...
The coexistence of two stable limit cycles exhibiting different periods is examined for a nonlinear ...
This paper investigates a reaction-diffusion system modeling three competing species, with diffusion...
The thesis is on the limit cycle in nonlinear dynamics systems. To begin, I mention a nonlinear syst...
The influence of global inhibition on travelling pulses both in infinite and in finite periodic syst...
ilhorst, Logak and Nishiura [10] and to Chen, Hilhorst and Logak [4] for the application of similar ...