Spatially quasi-periodic solutions of the Euler equation
Abstract
We develop a framework for studying quasi-periodic maps and diffeomorphisms on Rn. As an application, we prove that the Euler equation is locally well posed in a space of quasi-periodic vector fields on Rn. In particular, the equation preserves the spatial quasi-periodicity of the initial data. Several results on the analytic dependence of solutions on the time and the initial data are proved.
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