Generalising the logistic map through the $q$-product
Abstract
We investigate a generalisation of the logistic map as (, ) where stands for a generalisation of the ordinary product, known as -product [Borges, E.P. Physica A {\bf 340}, 95 (2004)]. The usual product, and consequently the usual logistic map, is recovered in the limit , The tent map is also a particular case for . The generalisation of this (and others) algebraic operator has been widely used within nonextensive statistical mechanics context (see C. Tsallis, {\em Introduction to Nonextensive Statistical Mechanics}, Springer, NY, 2009). We focus the analysis for at the edge of chaos, particularly at the first critical point , that depends on the value of . Bifurcation diagrams, sensitivity to initial conditions, fractal dimension and rate of entropy growth are evaluated at , and connections with nonextensive statistical mechanics are explored.
Cite
@article{arxiv.1102.4609,
title = {Generalising the logistic map through the $q$-product},
author = {Robson W. S. Pessoa and Ernesto P. Borges},
journal= {arXiv preprint arXiv:1102.4609},
year = {2011}
}
Comments
12 pages, 23 figures, Dynamics Days South America. To be published in Journal of Physics: Conference Series (JPCS - IOP)