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Type: Article
Modified scattering operator for the derivative nonlinear schrodinger equation
Abstract:
We consider the derivative nonlinear Schrodinger equation i partial derivative(t)u + 1/2 partial derivative(2)(x)u = i partial derivative(x)(vertical bar u vertical bar(2)u), t is an element of R, x is an element of R. Our purpose is to prove that the modified scattering operator is defined as a map from the neighborhood of the origin in H-1,H-alpha+gamma to the neighborhood of the origin in H-1,H-alpha, where alpha > 1/2 and gamma > 0 is small. The weighted Sobolev space is defined by H-m,H-s = {phi is an element of L-2; parallel to(1 + x(2))(s/2) (1 - partial derivative(2)(x))(m/2) phi parallel to(L2) < infinity}.
We consider the derivative nonlinear Schrodinger equation i partial derivative(t)u + 1/2 partial derivative(2)(x)u = i partial derivative(x)(vertical bar u vertical bar(2)u), t is an element of R, x is an element of R. Our purpose is to prove that the modified scattering operator is defined as a map from the neighborhood of the origin in H-1,H-alpha+gamma to the neighborhood of the origin in H-1,H-alpha, where alpha > 1/2 and gamma > 0 is small. The weighted Sobolev space is defined by H-m,H-s = {phi is an element of L-2; parallel to(1 + x(2))(s/2) (1 - partial derivative(2)(x))(m/2) phi parallel to(L2) < infinity}.
Keywords: INTEGRABILITY; POSEDNESS; RANGE
Journal: SIAM Journal on Mathematical Analysis
ISSN: 0036-1410
Year: 2013
Volume: 45
Number: 6
Pages: 3854-3871
Created: 2014-01-15 13:16:04
Modified: 2014-02-04 10:59:28
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