Add to ORKGInfinite cascades of periodicity hubs were predicted and very recently observed experimentally to organize stable oscillations of some dissipative flows. Here we describe the global mechanism underlying the genesis and organization of networks of periodicity hubs in control parameter space of a simple prototypical flow. We show that spirals associated with periodicity hubs emerge/accumulate at the folding of certain fractal-like sheaves of Shilnikov homoclinic bifurcations of a common saddle-focus equilibrium. The specific organization of hub networks is found to depend strongly on the interaction between the homoclinic orbits and the global structure of the underlying attractor
Previous investigations have revealed that special constellations of feedback loops in a network can...
We study the influence of the initial topology of connections on the organization of synchronous beh...
In pipes and channels, the onset of turbulence is initially dominated by localizedtransi...
Abstract In this paper we examine spiral structures in bi-parametric diagrams of dissipative systems...
The chaotic dynamics of low-dimensional systems, such as Lorenz or Rössler flows, is guided by the i...
Recent studies suggest that unstable recurrent solutions of the Navier-Stokes equation provide new i...
The attractors of a dynamical system govern its typical long-term behaviour. The presence of many at...
We explore the multifractal, self-similar organization of heteroclinic and homoclinic bifurcations o...
A Duffing oscillator in a certain parameter range shows period-doubling that has the same Feigenbaum...
Random networks of coupled phase oscillators with phase shifts in the interaction functions are cons...
We report the discovery of a remarkable ‘‘periodicity hub’’ inside the chaotic phase of an electroni...
A representative model of a return map near homoclinic bifurcation is studied. This model is the so-...
For dynamical systems possessing invariant subspaces one can have a robust homoclinic cycle to a cha...
We study a network of logistic maps with two types of global coupling, inertial and dissipative. Fea...
High- and infinite-dimensional nonlinear dynamical systems often exhibit complicated flow (spatiote...
Previous investigations have revealed that special constellations of feedback loops in a network can...
We study the influence of the initial topology of connections on the organization of synchronous beh...
In pipes and channels, the onset of turbulence is initially dominated by localizedtransi...
Abstract In this paper we examine spiral structures in bi-parametric diagrams of dissipative systems...
The chaotic dynamics of low-dimensional systems, such as Lorenz or Rössler flows, is guided by the i...
Recent studies suggest that unstable recurrent solutions of the Navier-Stokes equation provide new i...
The attractors of a dynamical system govern its typical long-term behaviour. The presence of many at...
We explore the multifractal, self-similar organization of heteroclinic and homoclinic bifurcations o...
A Duffing oscillator in a certain parameter range shows period-doubling that has the same Feigenbaum...
Random networks of coupled phase oscillators with phase shifts in the interaction functions are cons...
We report the discovery of a remarkable ‘‘periodicity hub’’ inside the chaotic phase of an electroni...
A representative model of a return map near homoclinic bifurcation is studied. This model is the so-...
For dynamical systems possessing invariant subspaces one can have a robust homoclinic cycle to a cha...
We study a network of logistic maps with two types of global coupling, inertial and dissipative. Fea...
High- and infinite-dimensional nonlinear dynamical systems often exhibit complicated flow (spatiote...
Previous investigations have revealed that special constellations of feedback loops in a network can...
We study the influence of the initial topology of connections on the organization of synchronous beh...
In pipes and channels, the onset of turbulence is initially dominated by localizedtransi...