Linear dynamics of the semi-geostrophic equations in Eulerian coordinates on R3

Abstract

We consider a class of steady solutions of the semi-geostrophic equations on R3 and derive the linearised dynamics around those solutions. The linear PDE which governs perturbations around those steady states is a transport equation featuring a pseudo-differential operator of order 0. We study well-posedness of this equation in L2(R3;R3) introducing a representation formula for the solutions, and extend the result to the space of tempered distributions on R3. We investigate stability of the steady solutions by looking at plane wave solutions of the linearised problem, and discuss differences in the case of the quasi-geostrophic equations.