DocumentCode
2690890
Title
Solving Maxwell´s equations using fractional wave equations
Author
Warnick, Karl F. ; Russer, Peter
Author_Institution
Dept. of ECE, Brigham Young Univ., Provo, UT
fYear
2006
fDate
9-14 July 2006
Firstpage
927
Lastpage
930
Abstract
In this paper, Maxwell´s equations are transformed into a set of uncoupled, scalar first order differential equations. The spatial derivative operator in the transformed differential equations is a fractional Laplacian. Numerical method for solving the equations are investigated
Keywords
Laplace transforms; Maxwell equations; wave equations; Maxwell equations; fractional Laplacian; fractional wave equations; numerical method; spatial derivative operator; uncoupled scalar first order differential equations; Difference equations; Differential equations; Finite difference methods; Laplace equations; Maxwell equations; Partial differential equations; Propagation losses; Transforms; Transmission line matrix methods; Voltage;
fLanguage
English
Publisher
ieee
Conference_Titel
Antennas and Propagation Society International Symposium 2006, IEEE
Conference_Location
Albuquerque, NM
Print_ISBN
1-4244-0123-2
Type
conf
DOI
10.1109/APS.2006.1710682
Filename
1710682
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