We study optimal synchronization in networks of heterogeneous phase oscillators. Our main result is the derivation of a synchrony alignment function that encodes the interplay between network structure and oscillators' frequencies and can be readily optimized. We highlight its utility in two general problems: constrained frequency allocation and network design. In general, we find that synchronization is promoted by strong alignments between frequencies and the dominant Laplacian eigenvectors, as well as a qualitative matching between the heterogeneity of frequencies and network structure
Synchronous behavior brings advantages for complex systems. Yet, this advantage comes with a cost: E...
Maximally synchronizable networks (MSNs) are acyclic directed networks that maximize synchronizabili...
Abstract — The emergence of synchronization in a network of coupled oscillators is a pervasive topic...
We study optimal synchronization in networks of heterogeneous phase oscillators. Our main result is ...
We study optimal synchronization of networks of coupled phase oscillators. We extend previous theory...
Synchronization is central to many complex systems in engineering physics (e.g., the power-grid, Jos...
We present an analytical scheme to achieve optimal synchronization in multiplex networks of frustrat...
We study the dynamics of network-coupled phase oscillators in the presence of coupling frustration. ...
Heterogeneity in the degree (connectivity) distribution has been shown to suppress synchronization i...
We report erosion of synchronization in networks of coupled phase oscillators, a phenomenon where pe...
A recently proposed dimensional reduction approach for studying synchronization in the Kuramoto mode...
Synchronization in chaotic oscillatory systems has a wide array of applications in biology, physics ...
In this Letter we discuss a method for generating synchrony-optimized coupling architectures of Kura...
We study the dynamics of network-coupled phase oscillators in the presence of coupling frustration. ...
Synchronizing phase-frustrated Kuramoto oscillators, a challenge that has found applications from ne...
Synchronous behavior brings advantages for complex systems. Yet, this advantage comes with a cost: E...
Maximally synchronizable networks (MSNs) are acyclic directed networks that maximize synchronizabili...
Abstract — The emergence of synchronization in a network of coupled oscillators is a pervasive topic...
We study optimal synchronization in networks of heterogeneous phase oscillators. Our main result is ...
We study optimal synchronization of networks of coupled phase oscillators. We extend previous theory...
Synchronization is central to many complex systems in engineering physics (e.g., the power-grid, Jos...
We present an analytical scheme to achieve optimal synchronization in multiplex networks of frustrat...
We study the dynamics of network-coupled phase oscillators in the presence of coupling frustration. ...
Heterogeneity in the degree (connectivity) distribution has been shown to suppress synchronization i...
We report erosion of synchronization in networks of coupled phase oscillators, a phenomenon where pe...
A recently proposed dimensional reduction approach for studying synchronization in the Kuramoto mode...
Synchronization in chaotic oscillatory systems has a wide array of applications in biology, physics ...
In this Letter we discuss a method for generating synchrony-optimized coupling architectures of Kura...
We study the dynamics of network-coupled phase oscillators in the presence of coupling frustration. ...
Synchronizing phase-frustrated Kuramoto oscillators, a challenge that has found applications from ne...
Synchronous behavior brings advantages for complex systems. Yet, this advantage comes with a cost: E...
Maximally synchronizable networks (MSNs) are acyclic directed networks that maximize synchronizabili...
Abstract — The emergence of synchronization in a network of coupled oscillators is a pervasive topic...