engleski

The transport speed and optimal work in pulsating Frenkel-Kontorova models

We consider a generalized one-dimensional chain in a periodic potential (the Frenkel-Kontorova model), with dissipative, pulsating (or ratchet) dynamics as a model of transport when the average force on the system is zero. We find lower bounds on the transport speed under mild assumptions on the asymmetricity and steepness of the site potential. Physically relevant applications include explicit estimates of the pulse frequencies and mean spacings for which the transport is non-zero, and more specifically the pulse frequencies which maximize work. The bounds explicitly depend on the pulse period and subtle number-theoretical properties of the mean spacing. The used method is a study of the time evolution of spatially invariant measures in the space of measures equipped with the L1-Wasserstein metric. Even though it is applied here in a deterministic setting, thus could perhaps also be of use for ratchet models in random fields.

transport speed ; optimal work ; ratchet dynamics

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