Anisotropic Viscosities Estimation for the Stochastic Primitive Equations

The viscosity parameters plays a fundamental role in applications involving stochastic primitive equations (SPE), such as accurate weather predictions, climate modeling, and ocean current simulations. In this paper, we develop several novel estimators for the anisotropic viscosities in the SPE, using finite number of Fourier modes of a single sample path observed within a finite time interval. The focus is on analyzing the consistency and asymptotic normality of these estimators. We consider a torus domain and treat strong, pathwise solutions in the presence of additive white noise (in time). Notably, the analysis for estimating horizontal and vertical viscosities differs due to the unique structure of the SPE, as well as the fact that both parameters of interest are next to the highest order derivative. To the best of our knowledge, this is the first work addressing the estimation of anisotropic viscosities, with potential applicability of the methodology to other modeling.