Eyring-Kramers formula for the mean exit time of non-Gibbsian elliptic processes: the non characteristic boundary case

Abstract

In this work, we derive a new sharp asymptotic equivalent in the small temperature regime h 0 for the mean exit time from a bounded domain for the non-reversible process dX\t=b(X\t)dt + h \, dB\t under a generic orthogonal decomposition of b and when the boundary of is assumed to be non characteristic. The main contribution of this work lies in the fact that we do not assume that the process (X\t,t 0) is Gibbsian. In this case, a new correction term characterizing the non-Gibbsianness of the process appears in the equivalent of the mean exit time. The proof is mainly based on tools from spectral and semi-classical analysis.