Back to All Events

Exponential Convergence for 3D Stochastic Primitive Equations of the Large Scale Ocean

By Zhao DONG, Institute of Applied Mathematics, AMSS, CAS

In this paper, we consider the ergodicity for the three-dimensional stochastic primitive equations of the large scale oceanic motion. We proved that if the noise is at the same time sufficiently smooth and non-degenerate, then the weak solutions converge exponentially fast to equilibrium. Moreover, the uniqueness of invariant measure is stated.

Later Event: March 27
Closing Remarks