Berglund, N., Di Gesu, G., & Weber, H. (2017). An Eyring-Kramers law for the stochastic Allen-Cahn equation in dimension two. Electronic Journal of Probability, 22(none). https://doi.org/10.1214/17-ejp60
metastability; Statistics and Probability; Statistics, Probability and Uncertainty; Stochastic partial differential equations; Kramers´ law; renormalisation; potential theory; capacities; spectral Galerkin approximation; Wick calculus
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Abstract:
We study spectral Galerkin approximations of an Allen-Cahn equation over the twodimensional torus perturbed by weak space-time white noise of strength √ ε. We introduce a Wick renormalisation of the equation in order to have a system that is well-defined as the regularisation is removed. We show sharp upper and lower bounds on the transition times from a neighbourhood of the stable configuration −1 to the stable configuration 1 in the asymptotic regime ε → 0. These estimates are uniform in the discretisation parameter N, suggesting an Eyring-Kramers formula for the limiting renormalised stochastic PDE. The effect of the "infinite renormalisation" is to modify the prefactor and to replace the ratio of determinants in the finite-dimensional Eyring-Kramers law by a renormalised Carleman-Fredholm determinant.
