Statistical and Deterministic Dynamics of Maps with Memory
Abstract
We consider a dynamical system to have memory if it remembers the current state as well as the state before that. The dynamics is defined as follows: where is a one-dimensional map on and determines how much memory is being used. does not define a dynamical system since it maps into . In this note we let to be the symmetric tent map. We shall prove that for the orbits of are described statistically by an absolutely continuous invariant measure (acim) in two dimensions. As approaches from below, that is, as we approach a balance between the memory state and the present state, the support of the acims become thinner until at , all points have period 3 or eventually possess period 3. For , we have a global attractor: for all starting points in except , the orbits are attracted to the fixed point At we have slightly more complicated periodic behavior.
Cite
@article{arxiv.1604.06991,
title = {Statistical and Deterministic Dynamics of Maps with Memory},
author = {Paweł Góra and Abraham Boyarsky and Zhenyang Li and Harald Proppe},
journal= {arXiv preprint arXiv:1604.06991},
year = {2016}
}
Comments
37 pages