The ergodic theory of SPDEs in a weak-noise regime

Abstract

Consider a parabolic SPDE \[ ∂t u = u + σ(u)η, \] on (0\,,∞)×Rd, where η is a centered, generalized Gaussian noise with Cov[η(t\,,x)\,,η(s\,,y)]=δ0(t-s)(x-y) for a tempered Borel measure that is positive definite and satisfies a mild weak-noise. The existence of invariant measures of versions of these types of SPDEs has been studied at great length, particularly in the ``weak-noise regime''; see for example Assing and Manthey AssingManthey2003, Chen and Eisenberg ChenEisenberg2024, Chen, Ouyang, Tindel, and Xia ChenOuyangTindelXia2024, Eckmann and Hairer EckmannHairer2001, Misiats and Stanzhytskyi MSY2020, Yu Gu and Jiawei Li GuLi2020, and Tessitore and Zabczyk TessitoreZabczyk1998. Here, we characterize all annealed, ergodic, invariant measures for the above SPDE in the weak-noise regime.

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