Let S:[0,1]→[0,1] be a nonsingular transformation and let P:L1(0,1)→L1(0,1) be the corresponding Frobenius–Perron operator. In this paper we propose a parallel algorithm for computing a fixed density of P, using Ulam\u27s method and a modified Monte Carlo approach. Numerical results are also presented
Recent work on positive matrices has resulted in a new matrix method for generating chaotic maps wit...
The Frobenius-Perron operator describes the evolution of density functions in a dynamical system. Fi...
We develop a projection method for the computation of stationary densities of the Frobenius–Perron o...
Abstract- For a non-singular multi-dimensional mapping S: X � X, the corresponding Frobenius-Perron ...
Let S: [0,1] → [0,1] be a nonsingular transformation such that the corresponding Frobenius–Perron op...
AbstractLet T be a piecewise monotone, expanding, and C2 mapping of the unit interval to itself whic...
Let S: [0, 1] → [0, 1] be a nonsingular transformation that preserves an absolutely continuous invar...
Let the Frobenius–Perron operator PS:L1(0,1)→L1(0,1), related to a nonsingular transformation S:[0,1...
We prove that Ulam\u27s piecewise constant approximation algorithm is convergent for computing an ab...
We construct in this paper the first order and second order piecewise polynomial finite approximatio...
For a non-singular mapping S : [0, 1] → [0, 1], let P be the corresponding Frobenius–Perron operator...
We construct in this paper the first order and second order piecewise polynomial finite approximatio...
© 2020 Global Science Press. All rights reserved. Let S : X → X be a nonsingular transformation such...
The statistical study of chaotic dynamical systems has received a great deal of attention in the pas...
An automated method of general purpose is introduced for computing a rigorous estimate of a bounded ...
Recent work on positive matrices has resulted in a new matrix method for generating chaotic maps wit...
The Frobenius-Perron operator describes the evolution of density functions in a dynamical system. Fi...
We develop a projection method for the computation of stationary densities of the Frobenius–Perron o...
Abstract- For a non-singular multi-dimensional mapping S: X � X, the corresponding Frobenius-Perron ...
Let S: [0,1] → [0,1] be a nonsingular transformation such that the corresponding Frobenius–Perron op...
AbstractLet T be a piecewise monotone, expanding, and C2 mapping of the unit interval to itself whic...
Let S: [0, 1] → [0, 1] be a nonsingular transformation that preserves an absolutely continuous invar...
Let the Frobenius–Perron operator PS:L1(0,1)→L1(0,1), related to a nonsingular transformation S:[0,1...
We prove that Ulam\u27s piecewise constant approximation algorithm is convergent for computing an ab...
We construct in this paper the first order and second order piecewise polynomial finite approximatio...
For a non-singular mapping S : [0, 1] → [0, 1], let P be the corresponding Frobenius–Perron operator...
We construct in this paper the first order and second order piecewise polynomial finite approximatio...
© 2020 Global Science Press. All rights reserved. Let S : X → X be a nonsingular transformation such...
The statistical study of chaotic dynamical systems has received a great deal of attention in the pas...
An automated method of general purpose is introduced for computing a rigorous estimate of a bounded ...
Recent work on positive matrices has resulted in a new matrix method for generating chaotic maps wit...
The Frobenius-Perron operator describes the evolution of density functions in a dynamical system. Fi...
We develop a projection method for the computation of stationary densities of the Frobenius–Perron o...