Julie Levandosky, Mauricio Sepulveda, Octavio Vera
Published 2007-08-15Version 1
In this paper we study the smoothness properties of solutions to the KP-I equation. We show that the equation's dispersive nature leads to a gain in regularity for the solution. In particular, if the initial data $\phi$ possesses certain regularity and sufficient decay as $x \to \infty$, then the solution $u(t)$ will be smoother than $\phi$ for $0 < t \leq T$ where $T$ is the existence time of the solution.
Journal: Journal of Differential Equations 245, 3 (2008) 762-808
Quasi-geostrophic equations with initial data in Banach spaces of local measures
$C^{1,\al}$ regularity of solutions to parabolic Monge-Ampére equations
Dissipative quasi-geostrophic equations with initial data
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