A Finite Element Method for Solving Heimholt/ Type Equations in Waveguides and Other Unbounded Domains*

A finite element method is described for solving Helmholtz type boundary value problems in unbounded regions, including those with infinite boundaries. Typical examples include the propagation of acoustic or electromagnetic waves in waveguides. The radiation condition at infinity is based on separation of variables and differs from the classical Sommerfeld radiation condition. It is shown that the problem may be replaced by a boundary value problem on a fixed bounded domain. The behavior of the solution near infinity is incorporated in a nonlocal boundary condition. This problem is given a weak or variational formulation, and the finite element method is then applied. It is proved that optimal error estimates hold.

[1]  C. Goldstein,et al.  The finite element method with nonuniform mesh sizes for unbounded domains , 1981 .

[2]  Eigenfunction Expansions Associated with the Laplacian for Certain Domains with Infinite Boundaries. III : To the memory of my father, Emil Goldstein , 1969 .

[3]  C. Wilcox,et al.  Steady-state wave propagation in simple and compound acoustic waveguides , 1976 .

[4]  Samuel P. Marin,et al.  Variational methods for underwater acoustic problems , 1978 .

[5]  D. S. Jones,et al.  The theory of electromagnetism , 1964 .

[6]  Vidar Thomée,et al.  Discrete time Galerkin methods for a parabolic boundary value problem , 1974 .

[7]  J. Lions,et al.  Non-homogeneous boundary value problems and applications , 1972 .

[8]  M. Gunzburger,et al.  Boundary conditions for the numerical solution of elliptic equations in exterior regions , 1982 .

[9]  J. Pasciak,et al.  A new computational approach for the linearized scalar potential formulation of the magnetostatic field problem , 1982 .

[10]  H. Beckert,et al.  J. L. Lions and E. Magenes, Non‐Homogeneous Boundary Value Problems and Applications, II. (Die Grundlehren d. Math. Wissenschaften, Bd. 182). XI + 242 S. Berlin/Heidelberg/New York 1972. Springer‐Verlag. Preis geb. DM 58,— , 1973 .

[11]  M. J. Lighthill,et al.  The eigenvalues of ∇2u + λu=0 when the boundary conditions are given on semi-infinite domains , 1953, Mathematical Proceedings of the Cambridge Philosophical Society.

[12]  Zvi Ziegler,et al.  Approximation theory and applications , 1983 .

[13]  C. Goldstein,et al.  The finite element method with non-uniform mesh sizes applied to the exterior Helmholtz problem , 1982 .

[14]  Franco Brezzi,et al.  On the coupling of boundary integral and finite element methods , 1979 .

[15]  C. Goldstein Scattering Theory in Waveguides , 1974 .

[16]  R. Bruce Kellogg,et al.  Finite element analysis of a scattering problem , 1981 .