APS » PROLA » Phys. Rev. Lett. » Volume 91 » Issue 22

Phys. Rev. Lett. 91, 220601 (2003) [4 pages]

Minimal Brownian Ratchet: An Exactly Solvable Model
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Youngki Lee1,2, Andrew Allison3, Derek Abbott3, and H. Eugene Stanley2
1Yanbian University of Science & Technology, Beishan St. Yanji, Jilin 133000, China
2Center for Polymer Studies and Department of Physics, Boston University, Boston, Massachusetts 02215, USA
3Centre for Biomedical Engineering (CBME) and School of Electrical and Electronic Engineering, The University of Adelaide, SA 5005, Australia

Received 5 August 2002; published 24 November 2003

We develop an analytically solvable three-state discrete-time minimal Brownian ratchet (MBR), where the transition probabilities between states are asymmetric. By solving the master equations, we obtain the steady-state probabilities. Generally, the steady-state solution does not display detailed balance, giving rise to an induced directional motion in the MBR. For a reduced two-dimensional parameter space, we find the null curve on which the net current vanishes and detailed balance holds. A system on this curve is said to be balanced. On the null curve, an additional source of external random noise is introduced to show that a directional motion can be induced under the zero overall driving force.


©2003 The American Physical Society

URL: http://link.aps.org/abstract/PRL/v91/e220601
DOI: 10.1103/PhysRevLett.91.220601
PACS: 05.40.Ca

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