Eyring-Kramers Law for the Underdamped Langevin Process
Abstract
Consider the underdamped Langevin process (q(t),p(t))t≥0 in d×d. We derive the low-temperature asymptotic of its mean-transition time between basins of attraction for a double-well potential. This asymptotic is called Eyring-Kramers law and often relies in the literature on Potential theory tools which are ill-defined for hypoelliptic processes like the underdamped Langevin process. In this work, we implement a novel approach which circumvents the use of these traditional methods.
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