A method is suggested for the computation of the generalized dimensions of fractal attractors at the period-doubling transition to chaos. The approach is based on an eigenvalue problem formulated in terms of functional equations, with a coeffecient expressed in terms of Feigenbaum's universal fixed-point function. The accuracy of the results is determined only by precision of the representation of the universal function
The results of extensive computations are presented in order to accurately characterize transitions ...
The famous Birkhoff ergodic theorem shows that given an ergodic measure the averages of an integrabl...
We study the behavior of multifractal spectra on the boundary of their domains of definition. In par...
A method is suggested for the computation of the generalized dimensions of fractal attractors at the...
Journal of Statistical Physics, 121, pp. 671-695, http://dx.doi.org./10.1007/s10955-005-7011-4Intern...
Abstract. The usual fixed-size box-counting algorithms are inefficient for computing generalized fra...
The theory of dynamical systems has undergone a dramatical revolution in the 20th century. The beaut...
The box counting dimension $\mathit{d_{C}}$ and the correlation dimension $\mathit{d_{G}}$ change wi...
As an essential component in the demonstration of an atypical, q-deformed, statistical mechanical st...
Generalized dimensions of multifractal measures are usually seen as static objects, related to the s...
We introduce the mathematical concept of multifracfality and describe various multifractal spectra f...
Journal PaperUsual fixed-size box-counting algorithms are inefficient for computing generalized frac...
We consider a self-similar phase space with specific fractal dimension d being distributed with spec...
A new class of multifractal objects (“skewed” multifractals) is introduced, the mutiplicative gener...
Existing algorithms for accurately estimating the f() sin-gularity spectrum from the samples of gene...
The results of extensive computations are presented in order to accurately characterize transitions ...
The famous Birkhoff ergodic theorem shows that given an ergodic measure the averages of an integrabl...
We study the behavior of multifractal spectra on the boundary of their domains of definition. In par...
A method is suggested for the computation of the generalized dimensions of fractal attractors at the...
Journal of Statistical Physics, 121, pp. 671-695, http://dx.doi.org./10.1007/s10955-005-7011-4Intern...
Abstract. The usual fixed-size box-counting algorithms are inefficient for computing generalized fra...
The theory of dynamical systems has undergone a dramatical revolution in the 20th century. The beaut...
The box counting dimension $\mathit{d_{C}}$ and the correlation dimension $\mathit{d_{G}}$ change wi...
As an essential component in the demonstration of an atypical, q-deformed, statistical mechanical st...
Generalized dimensions of multifractal measures are usually seen as static objects, related to the s...
We introduce the mathematical concept of multifracfality and describe various multifractal spectra f...
Journal PaperUsual fixed-size box-counting algorithms are inefficient for computing generalized frac...
We consider a self-similar phase space with specific fractal dimension d being distributed with spec...
A new class of multifractal objects (“skewed” multifractals) is introduced, the mutiplicative gener...
Existing algorithms for accurately estimating the f() sin-gularity spectrum from the samples of gene...
The results of extensive computations are presented in order to accurately characterize transitions ...
The famous Birkhoff ergodic theorem shows that given an ergodic measure the averages of an integrabl...
We study the behavior of multifractal spectra on the boundary of their domains of definition. In par...