We introduce a new map-based neuron model derived from the dynamical perceptron family that has the best compromise between computational efficiency, analytical tractability, reduced parameter space and many dynamical behaviors. We calculate bifurcation and phase diagrams analytically and computationally that underpins a rich repertoire of autonomous and excitable dynamical behaviors. We report the existence of a new regime of cardiac spikes corresponding to nonchaotic aperiodic behavior. We compare the features of our model to standard neuron models currently available in the literature
International audienceSpiking neuron models are hybrid dynamical systems combining differential equa...
Phase oscillators are a common starting point for the reduced description of many single neuron mode...
Sometimes a simple mathematical model suffices for both testing and demonstrating fundamental dynami...
<div><p>We introduce a new map-based neuron model derived from the dynamical perceptron family that ...
We investigate the phase space dynamics of local systems of biological neurons in order to deduce th...
We investigate the phase space dynamics of local systems of biological neurons in order to deduce th...
Large-scale brain simulations require the investigation of large networks of realistic neuron models...
[résumé trop long]The important relationship between structure and function has always been a fundam...
Abstract In-depth understanding of the generic mech-anisms of transitions between distinct patterns ...
As we strive to understand the mechanisms underlying neural computation, mathematical models are inc...
In this modelling work, we adopted geometric slow-fast dissection and parameter continuation approac...
Central pattern generators (CPGs) are localized, autonomous neuronal networks that coordinate the mu...
We investigate the phase space dynamics of local systems of biological neurons in order to deduce th...
Non-linear integrate and fire neuron models introduced in \cite{touboul08}, such as Izhikevich and B...
This paper introduces a simple 1-dimensional map-based model of spiking neurons. During the past dec...
International audienceSpiking neuron models are hybrid dynamical systems combining differential equa...
Phase oscillators are a common starting point for the reduced description of many single neuron mode...
Sometimes a simple mathematical model suffices for both testing and demonstrating fundamental dynami...
<div><p>We introduce a new map-based neuron model derived from the dynamical perceptron family that ...
We investigate the phase space dynamics of local systems of biological neurons in order to deduce th...
We investigate the phase space dynamics of local systems of biological neurons in order to deduce th...
Large-scale brain simulations require the investigation of large networks of realistic neuron models...
[résumé trop long]The important relationship between structure and function has always been a fundam...
Abstract In-depth understanding of the generic mech-anisms of transitions between distinct patterns ...
As we strive to understand the mechanisms underlying neural computation, mathematical models are inc...
In this modelling work, we adopted geometric slow-fast dissection and parameter continuation approac...
Central pattern generators (CPGs) are localized, autonomous neuronal networks that coordinate the mu...
We investigate the phase space dynamics of local systems of biological neurons in order to deduce th...
Non-linear integrate and fire neuron models introduced in \cite{touboul08}, such as Izhikevich and B...
This paper introduces a simple 1-dimensional map-based model of spiking neurons. During the past dec...
International audienceSpiking neuron models are hybrid dynamical systems combining differential equa...
Phase oscillators are a common starting point for the reduced description of many single neuron mode...
Sometimes a simple mathematical model suffices for both testing and demonstrating fundamental dynami...