Abstract
By employing a variational technique on the eigenvalue equation for finite arrays of antiguides we obtain accurate analytical expressions for key parameters characterizing the adjacent array modes: the edge radiation loss, the loss caused by interelement losses, and the effective index. The upper adjacent mode at its maximum-loss point is found to be well approximated by the sum of two Bloch waves of wavenumbers /spl plusmn//spl pi//[(N-1)/spl Lambda/], where N is the element number, and /spl Lambda/ is the array period. The intermodal discrimination, /spl Delta//spl alpha/, between the adjacent mode and the resonant mode (at the adjacent-mode maximum-loss point) is found to be well approximated (<10% error) by /spl alpha//sub RR/, the resonant-mode loss at resonance. Accurate analytical expressions are also derived for the two-dimensional optical-mode confinement factor /spl Gamma/, and the dispersion between the resonant and adjacent modes. The obtained analytical formulas are discussed in light of device design, and general design rules are presented.< <ETX xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink">></ETX>
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