Please use this identifier to cite or link to this item: https://hdl.handle.net/11147/4003
Title: Nonlinear euler poisson Darboux equations exactly solvable in multidimensions
Authors: Ateş, Barış
Advisors: Pashaev, Oktay
Publisher: Izmir Institute of Technology
Abstract: The method of spherical means is the well known and elegant method of solving initial value problems for multidimensional PDE. By this method the problem reduced to the 1+1 dimensional one, which can be solved easily. But this method is restricted by only linear PDE and can not be applied to the nonlinear PDE. In the present thesis we study properties of the spherical means and nonlinear PDE for them. First we briefly review the main definitions and applications of the spherical means for the linear heat and the wave equations. Then we study operator representation for the spherical means, especially in two and three dimensional spaces. We find that the spherical means in complex space are determined by modified exponential function. We study properties of these functions and several applications to the heat equation with variable diffusion coefficient.Then nonlinear wave equations in the form of the Liouville equation, the Sine-Gordon equation and the hyperbolic Sinh-Gordon equations in odd space dimensions are introduced. By some combinations of functions we show that models are reducible to the 1+1 dimensional one on the half line.The Backlund transformations and exact particular solutions in the form of progressive waves are constructed. Then the initial value problem for the nonlinear Burgers equation and the Liouville equations are solved. Application of our solutions to spherical symmetric multidimensional problems is discussed.
Description: Thesis (Master)--Izmir Institute of Technology, Mathematics, Izmir, 2008 .
Includes bibliographical references (leaves: 73-74)
Text in English; Abstract: Turkish and English
ix, 78 leaves
URI: http://hdl.handle.net/11147/4003
Appears in Collections:Master Degree / Yüksek Lisans Tezleri

Files in This Item:
File Description SizeFormat 
T000682.pdfMasterThesis391.32 kBAdobe PDFThumbnail
View/Open
Show full item record



CORE Recommender

Page view(s)

152
checked on Nov 18, 2024

Download(s)

84
checked on Nov 18, 2024

Google ScholarTM

Check





Items in GCRIS Repository are protected by copyright, with all rights reserved, unless otherwise indicated.