The analysis of dissipatively coupled oscillators is challenging and highly relevant in power grids. Standard mathematical methods are not applicable, due to the lack of network symmetry induced by dissipative couplings. Here we demonstrate a close correspondence between stable synchronous states in dissipatively coupled oscillators, and the winding partition of their state space, a geometric notion induced by the network topology. Leveraging this winding partition, we accompany this article with an algorithms to compute all synchronous solutions of complex networks of dissipatively coupled oscillators. These geometric and computational tools allow us to identify anomalous behaviors of lossy networked systems. Counterintuitively, we show th...
This paper pursues to construct a theoretical framework which can efficiently capture the dynamics o...
The aim of this paper is to investigate complex dynamic networks which can model high-voltage power ...
We study synchronization dynamics in networks of coupled oscillators with bimodal distribu...
The analysis of dissipatively coupled oscillators is challenging and highly relevant in power grids....
Networks of phase oscillators are studied in various contexts, in particular in the modeling of the ...
The stability of synchronised networked systems is a multi-faceted challenge for many natural and te...
We study multistability in phase locked states in networks of phase oscillators under both Kuramoto ...
We investigate the influence that adding a new coupling has on the linear stability of the synchrono...
We propose a methodology to analyze synchronization in an ensemble of diffusively coupled multistabl...
We present a framework for analysing arbitrary networks of identical dissipative oscillators assumin...
We study synchronization dynamics in networks of coupled oscillators with bimodal distribution of na...
10 pages, 5 figuresInternational audienceIn the present study we consider a random network of Kuramo...
Coupled oscillator networks show complex interrelations between topological characteristics of the n...
Robust synchronization is essential to ensure the stable operation of many complex networked systems...
doi:10.1088/1367-2630/14/8/083036 Abstract. Robust synchronization is essential to ensure the stable...
This paper pursues to construct a theoretical framework which can efficiently capture the dynamics o...
The aim of this paper is to investigate complex dynamic networks which can model high-voltage power ...
We study synchronization dynamics in networks of coupled oscillators with bimodal distribu...
The analysis of dissipatively coupled oscillators is challenging and highly relevant in power grids....
Networks of phase oscillators are studied in various contexts, in particular in the modeling of the ...
The stability of synchronised networked systems is a multi-faceted challenge for many natural and te...
We study multistability in phase locked states in networks of phase oscillators under both Kuramoto ...
We investigate the influence that adding a new coupling has on the linear stability of the synchrono...
We propose a methodology to analyze synchronization in an ensemble of diffusively coupled multistabl...
We present a framework for analysing arbitrary networks of identical dissipative oscillators assumin...
We study synchronization dynamics in networks of coupled oscillators with bimodal distribution of na...
10 pages, 5 figuresInternational audienceIn the present study we consider a random network of Kuramo...
Coupled oscillator networks show complex interrelations between topological characteristics of the n...
Robust synchronization is essential to ensure the stable operation of many complex networked systems...
doi:10.1088/1367-2630/14/8/083036 Abstract. Robust synchronization is essential to ensure the stable...
This paper pursues to construct a theoretical framework which can efficiently capture the dynamics o...
The aim of this paper is to investigate complex dynamic networks which can model high-voltage power ...
We study synchronization dynamics in networks of coupled oscillators with bimodal distribu...