Dielectric waveguide formulations usually result in generalized eigenvalue problems which are non-Hermitian in nature. We solve this class of problems by a two stage process. In the first stage, a standard lumped eigenvalue problem is solved for a few eigenpairs of interest (usually the guided modes) by Arnoldi's method accelerated by Chebyshev polynomials. The solution is then refined for the actual unlumped generalised eigenvalue problem by using inflated inverse iteration. After the eigenvalues and eigenvectors have been calculated at the first point (preferably the highest frequency), the eigenpairs for the rest of the frequencies of interest are calculated for progressively smaller frequencies by inflated inverse iteration alone, using the eigenvectors of the last step as the initial guess. To demonstrate the efficacy of this method, we use a variational formulation for anisotropic, dielectric waveguides based only on the E/sub s/ components or only on the H/sub s/ components of the electromagnetic fields that was presented by Chew and Nasir (1989). In this formulation it was shown that due of the imposition of the divergence condition the spurious waveguide modes were eliminated.
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机译:介电波导公式通常会导致广义上的特征值问题,而这些特征值问题本质上是非Hermitian的。我们通过两个阶段的过程来解决此类问题。在第一阶段,通过切比雪夫多项式加速的阿诺迪方法,为几个感兴趣的特征对(通常为导模)解决了标准集总特征值问题。然后,通过使用膨胀的逆迭代,针对实际的非集总广义特征值问题对解决方案进行细化。在第一个点(最好是最高频率)计算出特征值和特征向量之后,剩下的感兴趣频率的特征对通过单独的膨胀逆迭代来计算,从而逐渐减小频率,使用最后一步的特征向量作为特征值。初步猜测。为了证明这种方法的有效性,我们仅根据Chew和Nasir提出的电磁场的E / sub s /分量或仅基于H / sub s /分量,对各向异性介质波导使用了变分公式( 1989)。在该公式中表明,由于施加了发散条件,消除了寄生波导模式。
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