Abstract
A logarithmic oscillator (in short, log-oscillator) behaves like an ideal thermostat because of its infinite heat capacity: When it weakly couples to another system, time averages of the system observables agree with ensemble averages from a Gibbs distribution with a temperature T that is given by the strength of the logarithmic potential. The resulting equations of motion are Hamiltonian and may be implemented not only in a computer but also with real-world experiments, e.g., with cold atoms. © 2012 American Physical Society.
Cite
CITATION STYLE
Campisi, M., Zhan, F., Talkner, P., & Hänggi, P. (2012). Logarithmic oscillators: Ideal hamiltonian thermostats. Physical Review Letters, 108(25). https://doi.org/10.1103/PhysRevLett.108.250601
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