Global Existence, Hamiltonian Conservation and Vanishing Viscosity for the Surface Quasi-Geostrophic Equation

Abstract

For any initial datum θ0∈ L43x it is proved the existence of a global-in-time weak solution θ∈ L∞t L43x to the surface quasi-geostrophic equation whose Hamiltonian, i.e. the H-12x norm, is constant in time. The solution is obtained as a vanishing viscosity limit. The main idea is to propagate in time the non-concentration of the L43x norm of the initial data, from which the strong compactness in the Hamiltonian norm is deduced. Minimal Onsager supercritical conditions preventing anomalous dissipation are given.