Higher-order dispersive systems: Difference between revisions

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where P(nabla) is an anti-selfadjoint constant coefficient operator, and F involves fewer derivatives on u than P and contains only quadratic and higher terms, and may possibly contain non-local operations such as Hilbert transforms, Hartree-type potentials, or Riesz transforms.  Such equations arise as various approximations to wave equations, see e.g. [Dy1979], [Hog1985].  Smoothing effects for the linear part of the equation were established in [BenKocSau2003], [Hs-p].  Nonlinear local existence in the analytic category was established in [Bd1993].  For smooth but not analytic data some local existence results have been established in [Tar1995], [Tar1997], [Ci-p].
where P(nabla) is an anti-selfadjoint constant coefficient operator, and F involves fewer derivatives on u than P and contains only quadratic and higher terms, and may possibly contain non-local operations such as Hilbert transforms, Hartree-type potentials, or Riesz transforms.  Such equations arise as various approximations to wave equations, see e.g. [Dy1979], [Hog1985].  Smoothing effects for the linear part of the equation were established in [BenKocSau2003], [Hs-p].  Nonlinear local existence in the analytic category was established in [Bd1993].  For smooth but not analytic data some local existence results have been established in [Tar1995], [Tar1997], [Ci-p].
One particularly interesting class of higher order dispersive equations is the [[KdV hierarchy]].


[[Category:Equations]]
[[Category:Equations]]

Revision as of 05:52, 28 July 2006

One can study more general dispersive equations of the general form

where P(nabla) is an anti-selfadjoint constant coefficient operator, and F involves fewer derivatives on u than P and contains only quadratic and higher terms, and may possibly contain non-local operations such as Hilbert transforms, Hartree-type potentials, or Riesz transforms. Such equations arise as various approximations to wave equations, see e.g. [Dy1979], [Hog1985]. Smoothing effects for the linear part of the equation were established in [BenKocSau2003], [Hs-p]. Nonlinear local existence in the analytic category was established in [Bd1993]. For smooth but not analytic data some local existence results have been established in [Tar1995], [Tar1997], [Ci-p].

One particularly interesting class of higher order dispersive equations is the KdV hierarchy.