Eigenmodes diffraction losses of marginally unstable semispherical resonator

Proceedings of LFNM'2000. 2nd International Workshop on Laser and Fiber-Optical Networks Modeling (Cat. No.00EX419) Pub Date : 2000-05-23 DOI:10.1109/LFNM.2000.854050

K. Muntean, V. Svich

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引用次数: 1

Abstract

The theory of modes in open laser resonators, stable as well as unstable both has received much attention for many years, due to the usefulness of these devices. The open resonator eigenmodes may be determined by solving the free-space Maxwell equations with perfect conductor boundary conditions on the mirrors. In the practice usually the Fresnel approximation is made for formulating the problem in the form of the well-known Fresnel-Kirchhoff equation. The solutions to this equation are generally not obtainable analytically. Numerical methods are applicable in the practice only at relatively small Fresnel number. For larger Fresnel number asymptotic methods have been developed which are good in the highly unstable region. However this asymptotic technique fails for marginally unstable resonators. In the stable region the eigenmodes are well described by Gaussian-Hermite solutions, which also become less accurate as the resonator becomes marginally stable. Thus, there is an area between the stable and unstable regions where neither the Gaussian beam theory nor asymptotic solution is valid.

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边缘不稳定半球面谐振器的本征模衍射损耗

开放激光谐振腔的模式理论，稳定和不稳定都受到了许多年来的关注，由于这些设备的实用性。开腔本征模可以通过求解具有完美导体边界条件的自由空间麦克斯韦方程组来确定。在实践中，通常采用菲涅耳近似来将问题表述为众所周知的菲涅耳-基尔霍夫方程。这个方程的解一般不能解析得到。数值方法在实际中只适用于较小的菲涅耳数。对于较大的菲涅耳数，渐近方法在高度不稳定区域表现良好。然而，这种渐近技术在边缘不稳定谐振器中失败。在稳定区域，本征模可以用高斯-埃尔米特解很好地描述，但当谐振器变得边缘稳定时，本征模也变得不那么精确。因此，在稳定和不稳定区域之间存在一个区域，在这个区域中高斯光束理论和渐近解都不成立。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Proceedings of LFNM'2000. 2nd International Workshop on Laser and Fiber-Optical Networks Modeling (Cat. No.00EX419)

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