Title :
Diagonal preconditioners for the EFIE using a wavelet basis
Author :
Canning, Francis X. ; Scholl, James F.
Author_Institution :
Rockwell Inst. Sci. Center, Thousand Oaks, CA, USA
fDate :
9/1/1996 12:00:00 AM
Abstract :
The electric field integral equation (EFIE) has found widespread use and in practice has been accepted as a stable method. However, mathematically, the solution of the EFIE is an “ill-posed” problem. In practical terms, as one uses more and more expansion and testing functions per wavelength, the condition number of the resulting moment-method matrix increases (without bound). This means that for high-sampling densities, iterative methods such as conjugate gradients converge more slowly. However, there is a way to change all this. The EFIE is considered using a wavelet basis for expansion and for testing functions. Then, the resulting matrix is multiplied on both sides by a diagonal matrix. This results in a well-conditioned matrix which behaves much like the matrix for the magnetic field integral equation (MFIE). Consequences for the stability and convergence rate of iterative methods are described
Keywords :
convergence of numerical methods; electric fields; integral equations; iterative methods; matrix algebra; method of moments; numerical stability; wavelet transforms; EFIE; MFIE; condition number; convergence rate; diagonal matrix; diagonal preconditioners; electric field integral equation; expansion functions; high-sampling densities; ill-posed problem; iterative methods; magnetic field integral equation; moment-method matrix; stability; stable method; testing functions; wavelength; wavelet basis; well-conditioned matrix; Canning; Convergence; Integral equations; Iterative methods; Magnetic fields; Moment methods; Sampling methods; Senior members; Stability; Testing;
Journal_Title :
Antennas and Propagation, IEEE Transactions on
