Add to ORKGSwitching between two modes of operation is a common property of biological systems. In continuous-time differential equation models, this is often realised by bistability, i.e. the existence of two asymptotically stable steadystates. Several biological models are shown to exhibit delayed switching, with a pronounced transient phase, in particular for near-threshold perturbations. This study shows that this delay in switching from one mode to the other in response to a transient input is reflected in local properties of an unstable saddle point, which has a one dimensional unstable manifold with a significantly slower eigenvalue than the stable ones. Thus, the trajectories first approximatively converge to the saddle point, then linger alon...
Biological switches are frequently encountered in mathematical modeling of biological systems becau...
In this paper we are interested in gaining local stability insights about the interior equilibria of...
AbstractThe increasing time delay usually destabilizes any dynamical system. In this paper we give a...
Bistable switches are frequently encountered in biological systems. Typically, a bistable switch mod...
Bistable dynamical switches are frequently encountered in mathematical modeling of biological system...
Bistable dynamical switches are frequently encountered in mathematical modeling of biological system...
Bistable dynamical switches are frequently encountered in mathematical modeling of biological system...
Supplementary Information Files for Delay-induced homoclinic bifurcations in modified gradient bista...
Nonlinear dynamical systems with time delay are abundant in applications but are notoriously difficu...
Abstract. Computational models for human decision making are typically based on the properties of bi...
We present three examples of delayed bifurcations for spike solutions of reaction-diffusion systems....
Smooth ordinary Delay Differential Equations (DDEs) appear in many applications, including neuroscie...
Many biological systems can switch between two distinct states. Once switched, the system remains st...
We study the nonlinear dynamics of two delay-coupled neural systems each modeled by excitable dynami...
We analyze examples of delayed bifurcations in reaction-diffusion systems in both the weakly and ful...
Biological switches are frequently encountered in mathematical modeling of biological systems becau...
In this paper we are interested in gaining local stability insights about the interior equilibria of...
AbstractThe increasing time delay usually destabilizes any dynamical system. In this paper we give a...
Bistable switches are frequently encountered in biological systems. Typically, a bistable switch mod...
Bistable dynamical switches are frequently encountered in mathematical modeling of biological system...
Bistable dynamical switches are frequently encountered in mathematical modeling of biological system...
Bistable dynamical switches are frequently encountered in mathematical modeling of biological system...
Supplementary Information Files for Delay-induced homoclinic bifurcations in modified gradient bista...
Nonlinear dynamical systems with time delay are abundant in applications but are notoriously difficu...
Abstract. Computational models for human decision making are typically based on the properties of bi...
We present three examples of delayed bifurcations for spike solutions of reaction-diffusion systems....
Smooth ordinary Delay Differential Equations (DDEs) appear in many applications, including neuroscie...
Many biological systems can switch between two distinct states. Once switched, the system remains st...
We study the nonlinear dynamics of two delay-coupled neural systems each modeled by excitable dynami...
We analyze examples of delayed bifurcations in reaction-diffusion systems in both the weakly and ful...
Biological switches are frequently encountered in mathematical modeling of biological systems becau...
In this paper we are interested in gaining local stability insights about the interior equilibria of...
AbstractThe increasing time delay usually destabilizes any dynamical system. In this paper we give a...