Convergence to a period one fixed point is investigated for both logistic and cubic maps. For the logistic map the relaxation to the fixed point is considered near a transcritical bifurcation while for the cubic map it is near a pitchfork bifurcation. We confirmed that the convergence to the fixed point in both logistic and cubic maps for a region close to the fixed point goes exponentially fast to the fixed point and with a relaxation time described by a power law of exponent -1. At the bifurcation point, the exponent is not universal and depends on the type of the bifurcation as well as on the nonlinearity of the map
In this work we present a study of the logistic map xn+1 = rxn(1 xn) based on the supertracks, a s...
This Demonstration illustrates the iteration of the logistic map h_a(x)=ax(1-x) for 2<a≤4. All the p...
The goal of this paper is to present a proof that for the logistic map the period-3 begins at . Th...
Convergence to a period one fixed point is investigated for both logistic and cubic maps. For the lo...
In this chapter, the Logistic Map is taken as the example demonstrating the generic stability proper...
We study the dynamics of the Forced Logistic Map in the cylinder. We compute a bifurcation diagram i...
In this paper we have developed dynamical behavior of logistic map. We have discussed some basic co...
The dynamics of the convergence to the critical attractor for the logistic map is investigated. At t...
We develop a framework for quantitative convergence analysis of Picard iterations of expansive set-v...
In the context of continuous mappings of the interval, one of the most striking features may be Shar...
We show a general relation between fixed point stability of suitably perturbed transfer operators an...
This will be a fast (and selective) review of the dynamics of the logistic map. Let us consider the ...
In the symmetric and the asymmetric trapezoid maps, as a slope a of the trapezoid is increased, a pe...
This paper compares three different types of "onset of chaos" in the logistic and generalized logist...
This paper discusses nonlinear discrete-time maps of the form x(k+1)=F(x(k)), focussing on equilibri...
In this work we present a study of the logistic map xn+1 = rxn(1 xn) based on the supertracks, a s...
This Demonstration illustrates the iteration of the logistic map h_a(x)=ax(1-x) for 2<a≤4. All the p...
The goal of this paper is to present a proof that for the logistic map the period-3 begins at . Th...
Convergence to a period one fixed point is investigated for both logistic and cubic maps. For the lo...
In this chapter, the Logistic Map is taken as the example demonstrating the generic stability proper...
We study the dynamics of the Forced Logistic Map in the cylinder. We compute a bifurcation diagram i...
In this paper we have developed dynamical behavior of logistic map. We have discussed some basic co...
The dynamics of the convergence to the critical attractor for the logistic map is investigated. At t...
We develop a framework for quantitative convergence analysis of Picard iterations of expansive set-v...
In the context of continuous mappings of the interval, one of the most striking features may be Shar...
We show a general relation between fixed point stability of suitably perturbed transfer operators an...
This will be a fast (and selective) review of the dynamics of the logistic map. Let us consider the ...
In the symmetric and the asymmetric trapezoid maps, as a slope a of the trapezoid is increased, a pe...
This paper compares three different types of "onset of chaos" in the logistic and generalized logist...
This paper discusses nonlinear discrete-time maps of the form x(k+1)=F(x(k)), focussing on equilibri...
In this work we present a study of the logistic map xn+1 = rxn(1 xn) based on the supertracks, a s...
This Demonstration illustrates the iteration of the logistic map h_a(x)=ax(1-x) for 2<a≤4. All the p...
The goal of this paper is to present a proof that for the logistic map the period-3 begins at . Th...