Iterative Solution of Systems of Linear Equations in Microwave Circuits Using a Block Quasi-Minimal Residual Algorithm
| Autor: | F.-K. Hübner, Horst Zscheile, R. Schlundt, Wolfgang Heinrich, G. Hebermehl |
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| Rok vydání: | 2001 |
| Předmět: |
65F15
Iterative method 65N22 Relaxation (iterative method) Krylov subspace Microwave device simulation System of linear equations System of linear algebraicequations Multiple right-hand sides Matrix (mathematics) Maxwell's equations Finite integration technique Eigenvalue problem 35Q60 Boundary value problem Scattering matrix Coefficient matrix 65F10 Algorithm Eigenvalues and eigenvectors Mathematics |
| Zdroj: | Lecture Notes in Computational Science and Engineering ISBN: 9783540421733 |
| Popis: | The electrical properties of monolithic microwave integrated circuits that are connected to transmission lines are described in terms of their scattering matrix using Maxwell’s equations. Using a finite-volume method the corresponding three-dimensional boundary value problem of Maxwell’s equations in the frequency domain can be solved by means of a two-step procedure. An eigenvalue problem for non-symmetric matrices yields the wave modes. The eigenfunctions determine the boundary values at the ports of the transmission lines for the calculation of the fields in the three-dimensional structure. The electromagnetic fields and the scattering matrix elements are achieved by the solution of large-scale systems of linear equations with indefinite complex symmetric coefficient matrices. In many situations, these matrix problems need to be solved repeatedly for different righthand sides, but with the same coefficient matrix. The block quasi-minimal residual algorithm is a block Krylov subspace iterative method that incorporates deflation to delete linearly and almost linearly dependent vectors in the underlying block Krylov sequences. |
| Databáze: | OpenAIRE |
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