Title :
Acceleration of the modal series in the Neumann scattering problem for a hemispherical shell
Author :
Denison, Douglas R. ; Scharstein, Robert
Author_Institution :
Dept. of Electr. Eng., Alabama Univ., Tuscaloosa, AL, USA
Abstract :
A mixed boundary value problem for the scalar acoustic field scattered by an axisymmetric plane wave incident upon a hard hemispherical shell is formulated. The resulting discontinuity in surface pressure is expressed in terms of a complete set of weighted Chebyshev polynomials that satisfy the correct asymptotic edge condition. In this way, the extremely slowly converging modal series of spherical wave functions is transformed to a convergent sum of physically motivated basis functions. Truncation to a finite number of unknown coefficients, together with Galerkin projection, yields a set of linear algebraic equations
Keywords :
Chebyshev approximation; Galerkin method; acoustic field; acoustic wave scattering; boundary integral equations; convergence of numerical methods; electromagnetic wave scattering; linear algebra; polynomials; wave functions; Galerkin projection; Neumann scattering problem; asymptotic edge condition; converging modal series; hard hemispherical shell; linear algebraic equations; mixed boundary value problem; physically motivated basis functions; scalar acoustic field; spherical wave functions; surface pressure; truncation; weighted Chebyshev polynomials; Acceleration; Acoustic scattering; Acoustic waves; Boundary value problems; Chebyshev approximation; Diffraction; Electromagnetic scattering; Geometry; Polynomials; Radar scattering;
Conference_Titel :
System Theory, 1993. Proceedings SSST '93., Twenty-Fifth Southeastern Symposium on
Conference_Location :
Tuscaloosa, AL
Print_ISBN :
0-8186-3560-6
DOI :
10.1109/SSST.1993.522737
