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Smoothing estimates for the periodic KdV equation

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dc.contributor Graduate Program in Mathematics.
dc.contributor.advisor Gürel, Burak.
dc.contributor.author Kuzgun, Şefika.
dc.date.accessioned 2023-03-16T11:21:42Z
dc.date.available 2023-03-16T11:21:42Z
dc.date.issued 2016.
dc.identifier.other MATH 2016 K88
dc.identifier.uri http://digitalarchive.boun.edu.tr/handle/123456789/15289
dc.description.abstract In this thesis we aim at understanding an article of M. B. Erdo gan and N. Tzirakis on the famous KdV (Korteweg-de Vries) equation, entitled \Global smoothing for the periodic KdV", which appeared in International Mathematics Research Notices in 2012. The article establishes smoothing estimates in the case of the periodic KdV equation. Roughly speaking, smoothing estimates indicate that the solutions to the equation turn out to be smoother than the initial data, and constitute a subject closely related to well-posedness problems. This smoothing e ect of a dispersive partial di erential equation (PDE) on its solutions has been studied extensively, but the global smoothing e ect in the periodic case was inaccessible prior to the paper of Erdo gan and Tzirakis. The most important tools they have used are the so-called Bourgain spaces, introduced by J. Bourgain, that are de ned speci cally for each equation and re ect the dispersion relation of the equation, and the so-called di erentiation by parts method.
dc.format.extent 30 cm.
dc.publisher Thesis (M.S.) - Bogazici University. Institute for Graduate Studies in Science and Engineering, 2016.
dc.subject.lcsh Korteweg-de Vries equation.
dc.title Smoothing estimates for the periodic KdV equation
dc.format.pages vii, 33 leaves ;


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