Effect of randomness in logistic maps
Abstract
We study a random logistic map where are bounded (), random variables independently drawn from a distribution. does not show any regular behaviour in time. We find that shows fully ergodic behaviour when the maximum allowed value of is . However , averaged over different realisations reaches a fixed point. For the system shows nonchaotic behaviour and the Lyapunov exponent is strongly dependent on the asymmetry of the distribution from which is drawn. Chaotic behaviour is seen to occur beyond a threshold value of () when () is varied. The most striking result is that the random map is chaotic even when is less than the threshold value at which chaos occurs in the non random map. We also employ a different method in which a different set of random variables are used for the evolution of two initially identical values, here the chaotic regime exists for all values.
Cite
@article{arxiv.1503.00427,
title = {Effect of randomness in logistic maps},
author = {Abdul Khaleque and Parongama Sen},
journal= {arXiv preprint arXiv:1503.00427},
year = {2016}
}