Book contents
- Frontmatter
- Dedication
- Contents
- Preface
- Part I Historical overview and early developments
- Part II Theoretical foundations
- Part III Experimental realizations of ratchet devices
- 7 Ratchets for colloidal particles
- 8 Cold atom ratchets
- 9 Solid-state ratchets
- 10 Bio-inspired molecular motors
- Appendix A Stochastic processes techniques
- Appendix B Symmetries in a 1D overdamped system
- Appendix C Floquet theory
- Index
8 - Cold atom ratchets
from Part III - Experimental realizations of ratchet devices
Published online by Cambridge University Press: 05 January 2016
- Frontmatter
- Dedication
- Contents
- Preface
- Part I Historical overview and early developments
- Part II Theoretical foundations
- Part III Experimental realizations of ratchet devices
- 7 Ratchets for colloidal particles
- 8 Cold atom ratchets
- 9 Solid-state ratchets
- 10 Bio-inspired molecular motors
- Appendix A Stochastic processes techniques
- Appendix B Symmetries in a 1D overdamped system
- Appendix C Floquet theory
- Index
Summary
Cold atoms in optical lattices are an ideal test bed to explore ratchet physics. This is largely due to the extreme tunability of optical lattice systems, which allows one to precisely control the shape of the potential and of any applied force, as well as to vary at will the level of dissipation. Since the very first demonstration of directed motion in a cold atom system by Mennerat-Robilliard et al. (1999), a number of experimental investigations with cold atoms in optical lattices have explored different aspects of the physics of ratchets. Here, the focus is first on the experiments in the classical regime which explored the relationship between symmetry and transport in a.c. driven ratchets. Experiments in the full quantum Hamiltonian regime are then described, and the unique features of such a regime highlighted.
Ratchets in dissipative optical lattices
Dissipative optical lattices
Optical lattices are periodic potentials for atoms created by the interference of two or more laser fields.The detuning between the laser fields and the nearest atomic transition will emerge as a key parameter to describe the light–atom interaction. It is thus important to distinguish two very different situations: the case of fardetuned laser fields, and the case of near-resonant laser fields. For far-detuned laser fields, a purely conservative potential is produced. As will be discussed in the following sections, far-detuned optical lattices are ideal to model Hamiltonian systems. In the case of near-resonant laser fields, the interaction between the laser and the atoms may lead, under appropriate conditions, to dissipative dynamics. That is, for an appropriately arranged set of near-resonant optical lattices, a dissipative optical lattice, is produced, where the set of laser fields produce at once the periodic potential acting on the atoms and the cooling mechanism, which decreases their kinetic energy and lead to the trapping of the atoms at the bottom of potential wells.
The principles behind the cooling mechanism, termed Sisyphus cooling for reasons which will become apparent in the following discussion, can be captured by considering the minimal configuration of a one-dimensional optical lattice and a Jg = 1/2 → Je = 3/2 atomic transition. This is the simplest configuration in which Sisyphus cooling takes place.
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- Brownian RatchetsFrom Statistical Physics to Bio and Nano-motors, pp. 117 - 138Publisher: Cambridge University PressPrint publication year: 2016