Study of eigen value equation of hyperbolic waveguide under slow wave consideration

机译：慢波条件下双曲波导本征值方程的研究

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The modal characteristics of a step-index waveguide with a hyperbolic core-cladding boundary have been studied. For the study of this new waveguide we select an elliptical coordinate system ,so that cross-sectional boundary is represented by a hyperbola .Using suitable boundary condition, and the field components,determined for a fourth order determinantal characteristic equation is obtained. The characteristic equation involve modified Mathieu functions, Mathieu functions and their derivative.

机译：研究了具有双曲线芯-包层边界的阶跃折射率波导的模态特性。为了研究这种新型波导，我们选择了一个椭圆坐标系，以便用双曲线表示截面边界。使用适当的边界条件，得到了确定四阶行列式特征方程的场分量。特征方程包括修改后的Mathieu函数，Mathieu函数及其导数。

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《2011 IEEE 2nd International Conference on Photonics》|2011年|p.1-5|共5页
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Kumar Deepak; Pillay Sharnini; Abdul-Rashid H.A.;
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中图分类光电子技术、激光技术;
关键词
elliptical coordinate sysyem; hyperbolic waveguide; modified mathieu functions;

机译：椭圆坐标系;双曲波导;修正的数学函数;

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Study of eigen value equation of hyperbolic waveguide under slow wave consideration

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