Strichartz estimates: Difference between revisions
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Strichartz estimates are spacetime estimates on homogeneous and inhomogeneous linear dispersive and wave equations. They are particularly useful for solving semilinear perturbations of such equations, in which no derivatives are present in the nonlinearity. | |||
Strichartz estimates can be derived abstractly as a consequence of a dispersive inequality and an energy inequality. | |||
[[Category:Estimates]] [[Category:Schrodinger]] [[Category:Wave]] [[Category:Airy]] | [[Category:Estimates]] [[Category:Schrodinger]] [[Category:Wave]] [[Category:Airy]] | ||
Revision as of 04:37, 2 August 2006
Strichartz estimates are spacetime estimates on homogeneous and inhomogeneous linear dispersive and wave equations. They are particularly useful for solving semilinear perturbations of such equations, in which no derivatives are present in the nonlinearity.
Strichartz estimates can be derived abstractly as a consequence of a dispersive inequality and an energy inequality.
