DocumentCode
432622
Title
Solution of parabolic equations by the least square method
Author
Oraizi, H. ; Hosseinzadeh, S.
Volume
2
fYear
2004
fDate
12-14 Oct. 2004
Firstpage
805
Lastpage
808
Abstract
In this paper, the parabolic approximation of wave equation will be solved by the method of least squares. At first, the radio wave propagation in homogeneous media will be considered. The electromagnetic field will he expanded by proper expansion functions, which satisfy the parabolic equation in homogeneous media. The expansion coefficients will be derived by the least square method for initial and boundary conditions. The least square functionals satisfy the initial and boundary conditions. Similar to the split step method, the field in the in-homogeneous media with known profile of refractive index can be obtained by proper phase shifting of the field in homogeneous media. This method is more reliable than the split step method and can be applied over rough boundary without any excess computations. In comparison with the finite difference method, the proposed method is very fast.
Keywords
Boundary conditions; Difference equations; Differential equations; Finite difference methods; Least squares approximation; Least squares methods; Nonhomogeneous media; Partial differential equations; Refractive index; Terrestrial atmosphere;
fLanguage
English
Publisher
ieee
Conference_Titel
Microwave Conference, 2004. 34th European
Conference_Location
Amsterdam, The Netherlands
Print_ISBN
1-58053-992-0
Type
conf
Filename
1418944
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