A simple proof of a Kramers'type law for self-stabilizing diffusions in double-wells landscape

exit problem (time and location) in convex landscapes, showing the same result as Herrmann, Imkeller and Peithmann, but without reconstructing the proofs of Freidlin and Wentzell..

In their remarkable work “Large deviations and a Kramers’ type law for self- stabilizing diffusions”, Herrmann, Imkeller and Peithmann establish large devi- ation results and solve

In order to conclude this study, we shall present some particular example of self-stabilizing diffusion which presents the following property: any invariant symmetric measure

Self-stabilizing processes: uniqueness problem for stationary mea- sures and convergence rate in the small-noise limit... Self-stabilizing processes: uniqueness problem for

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Such algorithms in multi-hop wireless networks do not try to minimize the number of used colors, but when the graph degree is bounded by a small constant (as it is the case in

The goal of the paper is to provide designers of distributed self- stabilizing protocols with a fair and reliable communication primitive which allows any process which writes a

The quasi rendezvous mechanism requires that between two write operations performed by the process A in W rite AB , the process B cannot perform but one and only one read operation