Oscillatory dynamics are ubiquitous in biological networks. Possible sources of oscillations are well understood in low-dimensional systems but have not been fully explored in high-dimensional networks. Here we study large networks consisting of randomly coupled rate units. We identify a type of bifurcation in which a continuous part of the eigenvalue spectrum of the linear stability matrix crosses the instability line at nonzero frequency. This bifurcation occurs when the interactions are delayed and partially antisymmetric and leads to a heterogeneous oscillatory state in which oscillations are apparent in the activity of individual units but not on the population-average level
The authors acknowledge financial support from H2020-MSCA-ITN-2015 project COSMOS 642563. We thank A...
Low-dimensional yet rich dynamics often emerge in the brain. Examples include oscillations and chaot...
We analyze the dynamic behavior of large two-dimensional systems of limit-cycle oscillators with ran...
We demonstrate that diffusively coupled limit-cycle oscillators on random networks can exhibit vario...
In this paper we study phase synchronization in random complex networks of coupled periodic oscillat...
Complex network comprised of interconnected oscillatory systems are investigated in various contexts...
The synchronous dynamics of an array of excitable oscillators, coupled via a generic graph, is studi...
Neuromorphic networks can be described in terms of coarse-grained variables, where emergent sustaine...
Neuromorphic networks can be described in terms of coarse-grained variables, where emergent sus-tain...
Random recurrent networks facilitate the tractable analysis of large networks. The spectrum of the c...
Synchronization is an emergent property in networks of interacting dynamical elements. Here we revie...
International audienceRealistic large-scale networks display a heterogeneous distribution of connect...
In recent years, an abundance of studies in complex systems research have focused on deciphering the...
Random networks of coupled phase oscillators with phase shifts in the interaction functions are cons...
International audienceRealistic networks display heterogeneous transmission delays. We analyze here ...
The authors acknowledge financial support from H2020-MSCA-ITN-2015 project COSMOS 642563. We thank A...
Low-dimensional yet rich dynamics often emerge in the brain. Examples include oscillations and chaot...
We analyze the dynamic behavior of large two-dimensional systems of limit-cycle oscillators with ran...
We demonstrate that diffusively coupled limit-cycle oscillators on random networks can exhibit vario...
In this paper we study phase synchronization in random complex networks of coupled periodic oscillat...
Complex network comprised of interconnected oscillatory systems are investigated in various contexts...
The synchronous dynamics of an array of excitable oscillators, coupled via a generic graph, is studi...
Neuromorphic networks can be described in terms of coarse-grained variables, where emergent sustaine...
Neuromorphic networks can be described in terms of coarse-grained variables, where emergent sus-tain...
Random recurrent networks facilitate the tractable analysis of large networks. The spectrum of the c...
Synchronization is an emergent property in networks of interacting dynamical elements. Here we revie...
International audienceRealistic large-scale networks display a heterogeneous distribution of connect...
In recent years, an abundance of studies in complex systems research have focused on deciphering the...
Random networks of coupled phase oscillators with phase shifts in the interaction functions are cons...
International audienceRealistic networks display heterogeneous transmission delays. We analyze here ...
The authors acknowledge financial support from H2020-MSCA-ITN-2015 project COSMOS 642563. We thank A...
Low-dimensional yet rich dynamics often emerge in the brain. Examples include oscillations and chaot...
We analyze the dynamic behavior of large two-dimensional systems of limit-cycle oscillators with ran...