Solutions g(x) of the functional equation g(g(x)) = f(x) are called iterative roots of the given function f(x). They are of interest in dynamical systems, chaos and complexity theory and also in the modelling of certain industrial and financial processes. The problem of computing this "square root" in function (or operator) spaces remains a hard task and is, for the general case, still unsolved. While the theory of functional equations provides some insight for realand complex valued functions, iterative roots of mappingsfrom Rn to Rn are not well understood by theory and there exists no published numerical algorithm for their computation. Here we prove existence of iterative roots of a certain class of monotonic mappings in Rn spaces and d...
Let 1 a parts per thousand currency sign p a parts per thousand currency sign a. In this paper, we c...
In this paper we present the geometrical interpretation of several iterative methods to solve a nonl...
We study the dynamics of a higher-order family of iterative methods for solving non-linear equations...
Solutions φ(x) of the functional equation φ(φ(x)) = f(x) are called iterative roots of the given fun...
Many real processes are composed of a n-fold repetition of some simpler process. If the whole proces...
In his „essay towards a calculus of functions “ from 1815 Charles Babbage introduced a branch of mat...
The classical development of neural networks has primarily focused on learning mappings between fini...
To approximate a simple root of an equation we construct families of iterative maps of higher order ...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
AbstractGraphs of the single-step operator for first-order logic programs—displayed in the real plan...
We start from the contractive functional equation proposed in [4], where it was shown that the polyn...
Based on dynamical systems theory, a computational method is proposed to locate all the roots of a ...
AbstractBased on the iterative root theory for monotone functions, an algorithm for computing polygo...
A complex-valued generalization of neural networks is presented. The dynamics of complex neural netw...
We study changes of coordinates that allow the embedding of ordinary differential equations describi...
Let 1 a parts per thousand currency sign p a parts per thousand currency sign a. In this paper, we c...
In this paper we present the geometrical interpretation of several iterative methods to solve a nonl...
We study the dynamics of a higher-order family of iterative methods for solving non-linear equations...
Solutions φ(x) of the functional equation φ(φ(x)) = f(x) are called iterative roots of the given fun...
Many real processes are composed of a n-fold repetition of some simpler process. If the whole proces...
In his „essay towards a calculus of functions “ from 1815 Charles Babbage introduced a branch of mat...
The classical development of neural networks has primarily focused on learning mappings between fini...
To approximate a simple root of an equation we construct families of iterative maps of higher order ...
Solving nonlinear equations in Banach spaces (real or complex nonlinear equations, nonlinear systems...
AbstractGraphs of the single-step operator for first-order logic programs—displayed in the real plan...
We start from the contractive functional equation proposed in [4], where it was shown that the polyn...
Based on dynamical systems theory, a computational method is proposed to locate all the roots of a ...
AbstractBased on the iterative root theory for monotone functions, an algorithm for computing polygo...
A complex-valued generalization of neural networks is presented. The dynamics of complex neural netw...
We study changes of coordinates that allow the embedding of ordinary differential equations describi...
Let 1 a parts per thousand currency sign p a parts per thousand currency sign a. In this paper, we c...
In this paper we present the geometrical interpretation of several iterative methods to solve a nonl...
We study the dynamics of a higher-order family of iterative methods for solving non-linear equations...