Large fluctuations in multi-attractor systems and the generalized Kramers problem
Abstract
The main subject of the paper is an escape from a multi-well metastable potential on a time-scale of a formation of the quasi-equilibrium between the wells. The main attention is devoted to such ranges of friction in which an external saddle does not belong to a basin of attraction of an initial attractor. A complete rigorous analysis of the problem for the most probable escape path is presented and a corresponding escape rate is calculated with a logarithmic accuracy. Unlike a conventional rate for a quasi-stationary flux, the rate on shorter time-scales strongly depends on friction, moreover, it may undergo oscillations in the underdamped range and a cutoff in the overdamped range. A generalization of the results for inter-attractor transitions in stable potentials with more than two wells is also presented as well as a splitting procedure for a phenomenological description of inter-attractor transitions is suggested. Applications to such problems as a dynamics of escape on time-scales shorter than an optimal fluctuation duration, prehistory problem, optimal control of fluctuations, fluctuational transport in ratchets, escapes at a periodic driving and transitions in biased Josephson junctions and ionic channels are briefly discussed.
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