It is shown how chaotic systems with more than one strange attractor can be controlled. Issues in controlling multiple (coexisting) strange attractors are stabilizing a desired motion within one attractor as well as taking the system dynamics from one attractor to another. Realization of these control objectives is demonstrated using a numerical example, the Newton-Leipnik system (1981)
Of the eight types of hyperbolic equilibrium points in three-dimensional flows, one is overwhelmingl...
The analysis of chaotic attractor generation is given, and the generation of novel chaotic attractor...
This paper is divided into two main portions. First, we look at basins of attraction as a tool with ...
Abstract. This paper firstly introduces the chaotic system Newton---Leipnik system which possesses t...
In this paper, we present a class of three-dimensional dynamical systems having multiscrolls which w...
This paper presents several new chaos generators, switching piecewise-linear controllers, which can ...
In this paper, a more general third-order chaotic system with attraction/repulsion function is intro...
In this paper, a more general third-order chaotic system with attraction/repulsion function is intro...
The Cournot triopoly model may possess a triple chaotic attractor. In the paper, we present an appro...
There have been many different investigations of nonlinear dynamical systems. In this paper, we intr...
Abstract—This paper presents several new chaos generators, switching piecewise-linear controllers, w...
Chaos is a typical phenomenon in nonlinear dynamical systems. Until recently, the extreme sensitivit...
Purpose: The purpose of this paper is to investigate coexisting attractors, chaos control and synchr...
AbstractIn this paper, we design a series of chaotic systems that can generate one-directional, two-...
This paper proposes a new no-equilibrium chaotic system that has the ability to yield infinitely man...
Of the eight types of hyperbolic equilibrium points in three-dimensional flows, one is overwhelmingl...
The analysis of chaotic attractor generation is given, and the generation of novel chaotic attractor...
This paper is divided into two main portions. First, we look at basins of attraction as a tool with ...
Abstract. This paper firstly introduces the chaotic system Newton---Leipnik system which possesses t...
In this paper, we present a class of three-dimensional dynamical systems having multiscrolls which w...
This paper presents several new chaos generators, switching piecewise-linear controllers, which can ...
In this paper, a more general third-order chaotic system with attraction/repulsion function is intro...
In this paper, a more general third-order chaotic system with attraction/repulsion function is intro...
The Cournot triopoly model may possess a triple chaotic attractor. In the paper, we present an appro...
There have been many different investigations of nonlinear dynamical systems. In this paper, we intr...
Abstract—This paper presents several new chaos generators, switching piecewise-linear controllers, w...
Chaos is a typical phenomenon in nonlinear dynamical systems. Until recently, the extreme sensitivit...
Purpose: The purpose of this paper is to investigate coexisting attractors, chaos control and synchr...
AbstractIn this paper, we design a series of chaotic systems that can generate one-directional, two-...
This paper proposes a new no-equilibrium chaotic system that has the ability to yield infinitely man...
Of the eight types of hyperbolic equilibrium points in three-dimensional flows, one is overwhelmingl...
The analysis of chaotic attractor generation is given, and the generation of novel chaotic attractor...
This paper is divided into two main portions. First, we look at basins of attraction as a tool with ...
DOI
Add to ORKG