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C. Kenig, G. Ponce, L. Vega (1993)
Well‐posedness and scattering results for the generalized korteweg‐de vries equation via the contraction principleCommunications on Pure and Applied Mathematics, 46
J. Bony (1980)
Calcul symbolique et propagation des singularités pour les équations aux dérivées partielles non linéairesAnnales Scientifiques De L Ecole Normale Superieure, 14
T. Tao (2001)
Multilinear weighted convolution of L 2 functions, and applications to non-linear dispersive equationsAmer. J. Math., 123
(2009)
Riccati function solutions of nonlinear dispersive-dissipative mKdv equation
(1993)
Fourier restriction phenomena for certain lattice subsets and applications to nonlinear evolution equations
X. Carvajal (2004)
LOCAL WELL-POSEDNESS FOR A HIGHER ORDER NONLINEAR SCHR ¨ ODINGER EQUATION IN SOBOLEV SPACES OF NEGATIVE INDICESarXiv: Analysis of PDEs
J. Bony, J. Chemin (1994)
Espaces fonctionnels associés au calcul de Weyl-HörmanderBulletin de la Société Mathématique de France, 122
J. Rauch, M. Reed (1982)
Nonlinear microlocal analysis of semilinear hyperbolic systems in one space dimensionDuke Mathematical Journal, 49
M. Beals (1983)
Self-spreading and strength of singularities for solutions to semilinear wave equationsAnnals of Mathematics, 118
T. Tao (2000)
Multilinear weighted convolution of L2 functions, and applications to nonlinear dispersive equationsAmerican Journal of Mathematics, 123
L. Molinet, Francis Ribaud (2002)
On the low regularity of the Korteweg-de Vries-Burgers equationInternational Mathematics Research Notices, 2002
G. Saccomandi, M. Destrade (2008)
A note about waves in dissipative and dispersive solids
C. Kenig, G. Ponce, L. Vega (2001)
On the ill-posedness of some canonical dispersive equationsDuke Mathematical Journal, 106
L. Molinet, Francis Ribaud (2001)
The cauchy problem for dissipative Korteweg de Vries equations in Sobolev spaces of negative orderIndiana University Mathematics Journal, 50
M. Destrade, G. Saccomandi (2008)
Proceedings WASCOM 2007. 14th Conference on waves and stability in continuous media, Baia Samuele, Sicily, Italy, 30 June–6 July 2007
E. Ott, R. Sudan (1970)
Damping of Solitary WavesPhysics of Fluids, 13
Following ideas of T. Tao, [14] on [k, Z] multipliers, we establish a generalized trilinear estimate for the unitary group associated to KdV equation. Particular cases of this trilinear estimate are: the 1/4 trilinear estimate in [14] and the −1/4+ estimate in [5], we also present an application of this inequality for a model dissipative-dispersive.
Bulletin of the Brazilian Mathematical Society, New Series – Springer Journals
Published: Nov 10, 2012
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