Add to ORKGIn 1979, H. K. Moffatt has pointed out that the conventional treatment of the simplest self-exciting homopolar disc dynamo has inconsistencies because of the neglect of induced azimuthal eddy currents, which can be resolved by introducing a segmented disc dynamo. Here we return to the simple dynamo system proposed by Moffatt, and demonstrate previously unknown hidden chaotic attractors. Then we study multistability and coexistence of three types of attractors in the autonomous dynamo system in three dimensions: equilibrium points, limit cycles and hidden chaotic attractors. In addition, the existence of two homoclinic orbits is proved rigorously by the generalized Melnikov method. Finally, by using Poincar´e compactification of polynomial v...
Abstract. We develop a general technique for proving the existence of chaotic attractors for three d...
The study of hidden attractors plays a very important role in the engineering applications of nonlin...
This paper studies the hidden dynamics of a class of two-dimensional maps inspired by the Hénon map....
We report on the finding of hidden hyperchaos in a 5D extension to a known 3D self-exciting homopola...
We study in great detail a system of three first-order ordinary differential equations describing a ...
Hide et al. (Hide, Skeldon & Acheson 1996 Proc. R. Soc. A452, 1369–1395) introduced a nonlinear syst...
In this article, we return to a four-dimensional model for a self-exciting Faraday disk dynamo, orig...
Purpose: The purpose of this paper is to investigate coexisting attractors, chaos control and synchr...
In this paper we investigate the dynamics associated with a degenerate codimension-two Takens-Bogdan...
Localization of hidden attractors is one of the most challenging tasks in the nonlinear dynamics due...
Of the eight types of hyperbolic equilibrium points in three-dimensional flows, one is overwhelmingl...
Based on the segmented disc dynamo proposed by H. K. Moffatt, we give out the hidden chaotic attract...
Symmetrically coupled systems of N self-exciting Faraday disk homopolar dynamos have been proposed b...
Complex dynamical systems, ranging from the climate, ecosystems to financial markets and engineering...
Plane nonlinear dynamo waves can be described by a sixth order system of nonlinear ordinary differen...
Abstract. We develop a general technique for proving the existence of chaotic attractors for three d...
The study of hidden attractors plays a very important role in the engineering applications of nonlin...
This paper studies the hidden dynamics of a class of two-dimensional maps inspired by the Hénon map....
We report on the finding of hidden hyperchaos in a 5D extension to a known 3D self-exciting homopola...
We study in great detail a system of three first-order ordinary differential equations describing a ...
Hide et al. (Hide, Skeldon & Acheson 1996 Proc. R. Soc. A452, 1369–1395) introduced a nonlinear syst...
In this article, we return to a four-dimensional model for a self-exciting Faraday disk dynamo, orig...
Purpose: The purpose of this paper is to investigate coexisting attractors, chaos control and synchr...
In this paper we investigate the dynamics associated with a degenerate codimension-two Takens-Bogdan...
Localization of hidden attractors is one of the most challenging tasks in the nonlinear dynamics due...
Of the eight types of hyperbolic equilibrium points in three-dimensional flows, one is overwhelmingl...
Based on the segmented disc dynamo proposed by H. K. Moffatt, we give out the hidden chaotic attract...
Symmetrically coupled systems of N self-exciting Faraday disk homopolar dynamos have been proposed b...
Complex dynamical systems, ranging from the climate, ecosystems to financial markets and engineering...
Plane nonlinear dynamo waves can be described by a sixth order system of nonlinear ordinary differen...
Abstract. We develop a general technique for proving the existence of chaotic attractors for three d...
The study of hidden attractors plays a very important role in the engineering applications of nonlin...
This paper studies the hidden dynamics of a class of two-dimensional maps inspired by the Hénon map....