Pulse-coupled systems such as spiking neural networks exhibit nontrivial invariant sets in the form of attracting yet unstable saddle periodic orbits where units are synchronized into groups. Heteroclinic connections between such orbits may in principle support switching processes in these networks and enable novel kinds of neural computations. For small networks of coupled oscillators, we here investigate under which conditions and how system symmetry enforces or forbids certain switching transitions that may be induced by perturbations. For networks of five oscillators, we derive explicit transition rules that for two cluster symmetries deviate from those known from oscillators coupled continuously in time. A third symmetry yields heteroc...
Under which conditions can a network of pulse-coupled oscillators sustain stable collective activity...
We present a framework for analysing arbitrary networks of identical dissipative oscillators assumin...
In this thesis we study aspects of periodic activity in model mutually-coupled oscillators inspired ...
Pulse-coupled systems such as spiking neural networks exhibit nontrivial invariant sets in the form ...
Abstract We review some examples of dynamics displaying sequential switching for systems of coupled ...
Is a periodic orbit underlying a periodic pattern of spikes in a heterogeneous neural network stable...
Copyright © by Society for Industrial and Applied Mathematics. Unauthorized reproduction of this art...
We show that a ring of unidirectionally delay-coupled spiking neurons may possess a multitude of sta...
The mathematical theory of pattern formation in electrically coupled networks of excitable neurons f...
This is the author accepted manuscript. The final version is available from American Physical Societ...
Systems of globally coupled phase oscillators can have robust attractors that are heteroclinic netwo...
The study of nonlinear oscillations is important in a variety of physical and biological contexts (e...
In this article I investigate the novel synchronization behaviors of evolving pulse-coupled oscillat...
A dynamical theory of spike train transitions in networks of pulse-coupled integrateand- fire (IF) n...
We present and analyze the first example of a dynamical system that naturally exhibits attracting pe...
Under which conditions can a network of pulse-coupled oscillators sustain stable collective activity...
We present a framework for analysing arbitrary networks of identical dissipative oscillators assumin...
In this thesis we study aspects of periodic activity in model mutually-coupled oscillators inspired ...
Pulse-coupled systems such as spiking neural networks exhibit nontrivial invariant sets in the form ...
Abstract We review some examples of dynamics displaying sequential switching for systems of coupled ...
Is a periodic orbit underlying a periodic pattern of spikes in a heterogeneous neural network stable...
Copyright © by Society for Industrial and Applied Mathematics. Unauthorized reproduction of this art...
We show that a ring of unidirectionally delay-coupled spiking neurons may possess a multitude of sta...
The mathematical theory of pattern formation in electrically coupled networks of excitable neurons f...
This is the author accepted manuscript. The final version is available from American Physical Societ...
Systems of globally coupled phase oscillators can have robust attractors that are heteroclinic netwo...
The study of nonlinear oscillations is important in a variety of physical and biological contexts (e...
In this article I investigate the novel synchronization behaviors of evolving pulse-coupled oscillat...
A dynamical theory of spike train transitions in networks of pulse-coupled integrateand- fire (IF) n...
We present and analyze the first example of a dynamical system that naturally exhibits attracting pe...
Under which conditions can a network of pulse-coupled oscillators sustain stable collective activity...
We present a framework for analysing arbitrary networks of identical dissipative oscillators assumin...
In this thesis we study aspects of periodic activity in model mutually-coupled oscillators inspired ...