Geometry of shallow-water dynamics with thermodynamics
Abstract
We review the geometric structure of the IL0PE model, a rotating shallow-water model with variable buoyancy, thus sometimes called ``thermal'' shallow-water model. We start by discussing the Euler--Poincar\'e equations for rigid body dynamics and the generalized Hamiltonian structure of the system. We then reveal similar geometric structure for the IL0PE. We show, in particular, that the model equations and its (Lie--Poisson) Hamiltonian structure can be deduced from Morrison and Greene's (1980) system upon ignoring the magnetic field ( B = 0) and setting U(,s) = 12 s, where is mass density and s is entropy per unit mass. These variables play the role of layer thickness (h) and buoyancy () in the IL0PE, respectively. Included in an appendix is an explicit proof of the Jacobi identity satisfied by the Poisson bracket of the system.
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