Telecommunications and Radio Engineering

ISSN for PRINT: 0040-2508

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2005, Volume63

Issue 7-12

98 pages

DOI: 10.1615/TelecomRadEng.v63.i7

Issue price - $1182.00

V. M. Fitio
Lviv Polytechnic National University, 12 St. Bandera Str., Lviv, 79013, Ukraine

Ya. V. Bobitski
Lviv Polytechnic National University, 12 St. Bandera Str., Lviv, 79013, Ukraine; and Institute of Technology, University of Rzeszow, 16A Rejtana Str., 35-959 Rzeszow, Poland

H. P. Laba
Lviv Polytechnic National University, 12 St. Bandera Str., Lviv, 79013, Ukraine

The electromagnetic field of wave that propagates in the crystal is decomposed into plane waves in the classic method of computation of photonic crystal band structure. The problem of finding of the allowed frequencies for a wave vector in the first Brillouin zone is reduced to finding of eigenvalues and eigenvectors of the corresponding dimensional representation matrix, which provides for the required precision for finding of the allowed frequencies. Due to slow convergence of decomposition into plane waves it is necessary to solve the matrix equation of large dimension that requires considerable time of calculation. The suggested method of determination of the allowed frequencies is based on the coupled wave method (CWM) at the corresponding setting of periodic boundary conditions. This method is especially simple for 1D photonic crystals and it consists in finding the solution to the eigenvalue problem of TX = ρX type and the check-up whether the absolute value of eigenvalue p is equal to one. The dimensional representation of quadratic matrix T is 2 × 2. The eigenvalue problem of this type appears as a result of the application of the so-called T-algorithm, which is stable for 1D photonic crystal. The solution leads to the eigenvalue problem of TX = ρRX type and the check-up whether the absolute value of eigenvalue ρ is one at given frequency v and component k_x of wave vector for 2D photonic crystals, too. The eigenvalue problem of type of TX = ρRX arises due to the application of stable numerical S-algorithm. Dimensional representation of matrices T and R is 2N × 2N, where N is a number of the coupled waves. Frequency will be allowed, if the absolute value of eigenvalue is one. The dimensional representation 2N × 2N of the matrix equation in the suggested method is equivalent to the dimension N² × N² of the classic method from the point of view of calculation accuracy. Stable S-algorithm of calculation is developed. The calculations of band structure of 1D and 2D photonic crystal of the simplest form are performed. The dependencies of calculation accuracy upon the number of the coupled waves (N varies from 1 to 29) are obtained.

DOI: 10.1615/TelecomRadEng.v63.i9.30 Download article, 795-813 pages

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