TY - JOUR T1 - On Block Matrices Associated with Discrete Trigonometric Transforms and Their Use in the Theory of Wave Propagation AU - Nikolaos L. Tsitsas JO - Journal of Computational Mathematics VL - 6 SP - 864 EP - 878 PY - 2010 DA - 2010/12 SN - 28 DO - http://doi.org/10.4208/jcm.1004-m3193 UR - https://global-sci.org/intro/article_detail/jcm/8555.html KW - Discrete Trigonometric transforms, Block matrices, Efficient inversion algorithms, Wave radiation and scattering, Numerical methods in wave propagation theory. AB -

Block matrices associated with discrete Trigonometric transforms (DTT's) arise in the mathematical modelling of several applications of wave propagation theory including discretizations of scatterers and radiators with the Method of Moments, the Boundary Element Method, and the Method of Auxiliary Sources. The DTT's are represented by the Fourier, Hartley, Cosine, and Sine matrices, which are unitary and offer simultaneous diagonalizations of specific matrix algebras. The main tool for the investigation of the aforementioned wave applications is the efficient inversion of such types of block matrices. To this direction, in this paper we develop an efficient algorithm for the inversion of matrices with ${U}$-diagonalizable blocks (${U}$ a fixed unitary matrix) by utilizing the ${U}$-diagonalization of each block and subsequently a similarity transformation procedure. We determine the developed method's computational complexity and point out its high efficiency compared to standard inversion techniques. An implementation of the algorithm in Matlab is given. Several numerical results are presented demonstrating the CPU-time efficiency and accuracy for ill-conditioned matrices of the method. The investigated matrices stem from real-world wave propagation applications.