AbstractRecently, we have proposed a new probabilistic method for the control of chaotic systems [1]. In this paper, we apply our method to characteristic cases of chaotic maps (one- and two-dimensional examples). As these chaotic maps are structurally stable, they cannot be controlled using conventional control methods without significant change of the dynamics. Our method consists in the probabilistic coupling of the original system with a controlling system. This coupling can be understood as a feedback control of probabilistic nature. The chosen periodic orbit of the original system is a global attractor for the probability densities. The generalized spectral decomposition of the associated Frobenius-Perron operator provides a spectral ...
Optimal control is applied to a chaotic system. Reference is made to a well-known one-dimensional ma...
When a probabilistic description of deterministic chaos is feasible, it can describe the dynamical e...
Abstract — When strong multiplicative noise is added to a dynamical system, we find two distinct gen...
Recently, we have proposed a new probabilistic method for the control of chaotic systems [1]. In thi...
We propose a new, probabilistic, approach for the control of chaotic systems. This approach is illus...
2003Some important ideas froni classical control theory are introduced with the intention of applyin...
We derive an absolute condition for probabilistic control [Antoniou et al. 1996] of the unstable dyn...
AbstractAn algorithm is proposed whereby any chaotic transformation τ (i.e., one merely possessing a...
Chaos is a kind of nonlinear system response that has a dense set of unstable periodic orbits (UPOs)...
Abstract – A chaos control method suggested by Erjaee has been reviewed. It has been shown that this...
The Inverse Frobenius-Perron problem (IFPP) concerns the creation of discrete chaotic mappings with ...
In this paper two anticontrol algorithms for synthesis of discrete chaos are introduced. In these al...
Chaos is a typical phenomenon in nonlinear dynamical systems. Until recently, the extreme sensitivit...
We discuss the characterization of chaotic behaviors in random maps both in terms of the Lyapunov ex...
In this paper, we give a review of the Inverse Frobenius–Perron problem (IFPP): how to create chaot...
Optimal control is applied to a chaotic system. Reference is made to a well-known one-dimensional ma...
When a probabilistic description of deterministic chaos is feasible, it can describe the dynamical e...
Abstract — When strong multiplicative noise is added to a dynamical system, we find two distinct gen...
Recently, we have proposed a new probabilistic method for the control of chaotic systems [1]. In thi...
We propose a new, probabilistic, approach for the control of chaotic systems. This approach is illus...
2003Some important ideas froni classical control theory are introduced with the intention of applyin...
We derive an absolute condition for probabilistic control [Antoniou et al. 1996] of the unstable dyn...
AbstractAn algorithm is proposed whereby any chaotic transformation τ (i.e., one merely possessing a...
Chaos is a kind of nonlinear system response that has a dense set of unstable periodic orbits (UPOs)...
Abstract – A chaos control method suggested by Erjaee has been reviewed. It has been shown that this...
The Inverse Frobenius-Perron problem (IFPP) concerns the creation of discrete chaotic mappings with ...
In this paper two anticontrol algorithms for synthesis of discrete chaos are introduced. In these al...
Chaos is a typical phenomenon in nonlinear dynamical systems. Until recently, the extreme sensitivit...
We discuss the characterization of chaotic behaviors in random maps both in terms of the Lyapunov ex...
In this paper, we give a review of the Inverse Frobenius–Perron problem (IFPP): how to create chaot...
Optimal control is applied to a chaotic system. Reference is made to a well-known one-dimensional ma...
When a probabilistic description of deterministic chaos is feasible, it can describe the dynamical e...
Abstract — When strong multiplicative noise is added to a dynamical system, we find two distinct gen...