Some Results for the Primitive Equations with Physical Boundary Conditions
Abstract: In this paper we consider the (simplified) 3-dimensional primitive equations with \emph{physical boundary conditions}. We show that the equations with constant forcing have a bounded absorbing ball in the $H1$-norm and that a solution to the unforced equations has its $H1$-norm decay to 0. From this, we argue that there exists an invariant measure (on $H1$) for the equations under random kick-forcing.
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