Fourier analysis and partial differential equations

By:

Iorio, Rafael

Contributor(s):

Iorio, Valřia de Magalhês

Series: Cambridge studies in advanced mathematics ; 70Publication details: Cambridge University Press, 2001. Cambridge:Description: xi, 411 p. : ill. ; pb. ; 24 cmISBN:

9780521629096

Subject(s):

DDC classification:

515.2433 IOR

Summary: This book was first published in 2001. It provides an introduction to Fourier analysis and partial differential equations and is intended to be used with courses for beginning graduate students. With minimal prerequisites the authors take the reader from fundamentals to research topics in the area of nonlinear evolution equations. The first part of the book consists of some very classical material, followed by a discussion of the theory of periodic distributions and the periodic Sobolev spaces. The authors then turn to the study of linear and nonlinear equations in the setting provided by periodic distributions. They assume only some familiarity with Banach and Hilbert spaces and the elementary properties of bounded linear operators. After presenting a fairly complete discussion of local and global well-posedness for the nonlinear Schrödinger and the Korteweg-de Vries equations, they turn their attention, in the two final chapters, to the non-periodic setting, concentrating on problems that do not occur in the periodic case.

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Holdings
Item type	Current library	Collection	Call number	Status	Date due	Barcode
Books	IIT Gandhinagar General Stacks	General	515.2433 IOR (Browse shelf(Opens below))	Available		030096

Includes index.
Bibliography : p. 401-408.

This book was first published in 2001. It provides an introduction to Fourier analysis and partial differential equations and is intended to be used with courses for beginning graduate students. With minimal prerequisites the authors take the reader from fundamentals to research topics in the area of nonlinear evolution equations. The first part of the book consists of some very classical material, followed by a discussion of the theory of periodic distributions and the periodic Sobolev spaces. The authors then turn to the study of linear and nonlinear equations in the setting provided by periodic distributions. They assume only some familiarity with Banach and Hilbert spaces and the elementary properties of bounded linear operators. After presenting a fairly complete discussion of local and global well-posedness for the nonlinear Schrödinger and the Korteweg-de Vries equations, they turn their attention, in the two final chapters, to the non-periodic setting, concentrating on problems that do not occur in the periodic case.

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