English

Optimizing thermally affected ratchet currents using periodic perturbations

Statistical Mechanics 2018-05-31 v1 Chaotic Dynamics

Abstract

The purpose of the present work is to apply a recently proposed methodology to enlarge parameter domains for which optimal ratchet currents (RCs) are obtained. This task is performed by adding a suitable periodic perturbation FjF_j on a Ratchet mapping and the procedure consists in multiplying a particular class of generic Isoperiodic Stable Structures (ISSs), since the existence of non-zero RCs is directly related to the occurrence of stable domains. By proliferating the ISSs, it is possible to: (i) postpone thermal effects that usually increase the chaotic domain and (ii) demonstrate, by using a quantitative analysis, that the area which provides optimal RCs in the two-dimensional parameter space can be enlarged about 78%78\%. In addition, for some specific parameter combinations, non-zero RCs can be induced through the birth of a new attractor, which moves away as the strength of FjF_j increases. Clearly, the methodology applied to the ratchet mapping is an efficient way to deal with unavoidable thermal effects and its consequent undesirable dynamics, specially in experimental setups. As a second general remark, we conclude that our main findings can be extended to issues related to transport problems.

Cite

@article{arxiv.1805.11619,
  title  = {Optimizing thermally affected ratchet currents using periodic perturbations},
  author = {Rafael M. da Silva and Cesar Manchein and Marcus W. Beims},
  journal= {arXiv preprint arXiv:1805.11619},
  year   = {2018}
}

Comments

8 pages, 5 figures

R2 v1 2026-06-23T02:12:24.211Z