We obtain results for two distinct dynamical models: the Kuramoto model, a general model for coupled oscillator systems, and a model for opinion formation in social networks. Our main focus is on understanding the fixed points of these systems and their stability. For many models the stability of such fixed points can be studied with a Laplacian matrix. We give a formula for the inertia of these matrices, characterizing the real parts of the spectrum, by relating them to another matrix depending on the network topology. We then study the Kuramoto model, and in particular, the phenomena of synchronization, when all oscillators rotate at a common frequency, which corresponds to a fixed point. This phenomenon is well-known to depend on the na...
We study multistability in phase locked states in networks of phase oscillators under both Kuramoto ...
Kuramoto oscillators are widely used to explain collective phenomena in networks of coupled oscillat...
This thesis seeks to study synchronization of coupled phase oscillators in different systems. First,...
We obtain results for two distinct dynamical models: the Kuramoto model, a general model for coupled...
The main focus of this thesis is to study the stability of fix points for a dynamical system. In the...
Synchronization is crucial for the correct functionality of many natural and man-made complex system...
The Kuramoto model for an ensemble of coupled oscillators provides a paradigmatic example of nonequi...
The incipience of synchrony in a diverse population of phase oscillators with non-identical interact...
Networks are ubiquitous in nature and engineering, with applications in areas such as modeling power...
Synchronization is crucial for the correct functionality of many natural and man-made complex system...
Motivated by real-world networks with evolving connections, we analyze how stochastic switching affe...
The Kuramoto model of coupled phase oscillators on small-world (SW) graphs is analyzed in this work....
Synchronization over networks depends strongly on the structure of the coupling between the oscillat...
In this paper we address local bifurcation properties of a family of networked dynamical systems, sp...
We consider various problems relating to synchronization in networks of cou-pled oscillators. In Cha...
We study multistability in phase locked states in networks of phase oscillators under both Kuramoto ...
Kuramoto oscillators are widely used to explain collective phenomena in networks of coupled oscillat...
This thesis seeks to study synchronization of coupled phase oscillators in different systems. First,...
We obtain results for two distinct dynamical models: the Kuramoto model, a general model for coupled...
The main focus of this thesis is to study the stability of fix points for a dynamical system. In the...
Synchronization is crucial for the correct functionality of many natural and man-made complex system...
The Kuramoto model for an ensemble of coupled oscillators provides a paradigmatic example of nonequi...
The incipience of synchrony in a diverse population of phase oscillators with non-identical interact...
Networks are ubiquitous in nature and engineering, with applications in areas such as modeling power...
Synchronization is crucial for the correct functionality of many natural and man-made complex system...
Motivated by real-world networks with evolving connections, we analyze how stochastic switching affe...
The Kuramoto model of coupled phase oscillators on small-world (SW) graphs is analyzed in this work....
Synchronization over networks depends strongly on the structure of the coupling between the oscillat...
In this paper we address local bifurcation properties of a family of networked dynamical systems, sp...
We consider various problems relating to synchronization in networks of cou-pled oscillators. In Cha...
We study multistability in phase locked states in networks of phase oscillators under both Kuramoto ...
Kuramoto oscillators are widely used to explain collective phenomena in networks of coupled oscillat...
This thesis seeks to study synchronization of coupled phase oscillators in different systems. First,...