Add to ORKGAbstract. We show that for the logistic map, almost every x is a normal number mod 2 with respect to all intervals except for [a, b] = [ 1 4, 1] or [a, b] = [
This paper is a review of the work done on the dynamics of modulated logistic systems. Three differe...
This is a sequel to our earlier work on the modulated logistic map. Here, we first show that the map...
The classic logistic map is widely used to show the properties of chaotic dynamics. This version let...
Abstract. If β> 1, then every non-negative number x has a β-expansion, i.e., x = 0(x)
We study the period-doubling bifurcations to chaos in a logistic map with a nonlinearly modulated pa...
AbstractWe study a generalised version of the logistic map of the unit interval (0,1), in which the ...
Abstract. We consider the map Tα,β(x): = βx + α mod 1, which admits a unique probability measure of ...
Dans cette thèse, nous étudions la théorie de la preuve des logiques modales non-normales. Ces logiq...
AbstractLet E be a subset of R − {0}. E is called a normal set if there exists a sequence (λn) of re...
The work shows the determinant of the standard map and logistic map with their chaoticity. The equat...
AbstractWe show that the number generated by the q-ary integer part of an entire function of logarit...
We have studied the bifurcation structure of the logistic map with a time dependant control paramete...
For an integer b ≥ 2 a real number α is b -normal if, for all m > 0, every m-long string of digits i...
Abstraet. We have studied the bifurcation structure oC the logistic map with a time dependant contro...
In dynamical statistics we are very often confronted with the problem of finding the best analytical...
This paper is a review of the work done on the dynamics of modulated logistic systems. Three differe...
This is a sequel to our earlier work on the modulated logistic map. Here, we first show that the map...
The classic logistic map is widely used to show the properties of chaotic dynamics. This version let...
Abstract. If β> 1, then every non-negative number x has a β-expansion, i.e., x = 0(x)
We study the period-doubling bifurcations to chaos in a logistic map with a nonlinearly modulated pa...
AbstractWe study a generalised version of the logistic map of the unit interval (0,1), in which the ...
Abstract. We consider the map Tα,β(x): = βx + α mod 1, which admits a unique probability measure of ...
Dans cette thèse, nous étudions la théorie de la preuve des logiques modales non-normales. Ces logiq...
AbstractLet E be a subset of R − {0}. E is called a normal set if there exists a sequence (λn) of re...
The work shows the determinant of the standard map and logistic map with their chaoticity. The equat...
AbstractWe show that the number generated by the q-ary integer part of an entire function of logarit...
We have studied the bifurcation structure of the logistic map with a time dependant control paramete...
For an integer b ≥ 2 a real number α is b -normal if, for all m > 0, every m-long string of digits i...
Abstraet. We have studied the bifurcation structure oC the logistic map with a time dependant contro...
In dynamical statistics we are very often confronted with the problem of finding the best analytical...
This paper is a review of the work done on the dynamics of modulated logistic systems. Three differe...
This is a sequel to our earlier work on the modulated logistic map. Here, we first show that the map...
The classic logistic map is widely used to show the properties of chaotic dynamics. This version let...