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On chaos for iterated function systems
This paper is devoted to study some chaotic properties of iterated function systems
(IFSs). Specially, a new notion named thick chaotic IFSs is introduced. The relationship
between thick chaos and another properties of some notions...
Limsup Shadowing Property and Chaotic Behaviours
property (Abbrev. POTP) in the shadowing way and discuss the relationship
between the POTP and the LSSP. First, we present some of its general
properties and then we characterize this notion of the shadowing in terms of
chaos....
Complexity and entropy in colliding particle systems
We develop quantitative measures of entropy evolution for particle systems undergoing collision process in relation with various instability properties.
The shadowing property and chaos
We discuss any kind of shadowing property and their chaotic behaviours.
Translation Industry in the Light of Complexity Science: A Case of Iranian Context
In line with the fact that multidisciplinary studies as a whole have gained momentum these days, it seems that translation studies as a relatively young discipline has recently tried to embrace new findings from other ...
Chaos Control and Global Stabilization of HIV Infection of CD+ 4 T-cells System
In this paper a chaotic nonlinear system that called HIV infection CD+
4 T-cells is considered, and
a new approach in order to stabilizing the unstable equilibrium points of HIV infection CD+
4 T-cells ...
Decoupling of an isosceles triangular three element array with one reactively loaded dummy element
Bifurcation and Chaos Prediction in Nonlinear Gear Systems
The homoclinic bifurcation and transition to chaos in gear systems are studied both analytically and numerically.ApplyingMelnikov analytical method, the threshold values for the occurrence of chaotic motion are obtained. The influence of system...
Shadowing and Chaos
In this short paper we show that if homeomorphism f on a compact
metric space X has the shadowing property and only one chain component,
then f is chaotic. As a corollary we show that generically f is chaotic.
Bifurcation and chaos in nonlinear gear vibration system
The homoclinic bifurcation and transition to chaos in gear systems is studied both analytically
and numerically. Applying Melnikov analytical method, the threshold values for the occur-
rence of chaotic motion is obtained...