黑森矩阵
波前
光学
雅可比矩阵与行列式
光路
泰勒级数
物理
光路长度
变量(数学)
基质(化学分析)
数学
数学分析
应用数学
材料科学
复合材料
作者
Yu‐Bin Chen,Psang Dain Lin
出处
期刊:Applied Optics
[Optica Publishing Group]
日期:2012-07-28
卷期号:51 (22): 5552-5552
被引量:4
摘要
A method is proposed for determining the second-order derivatives (i.e., the Hessian matrix) of the optical path length of a ray with respect to the variable vector of the source ray in an optical system comprising both flat and spherical boundary surfaces. Several wavefront aberration problems are investigated using the Hessian matrix proposed in this study and the Jacobian (first-order derivatives) matrix presented in the literature. It is found that when using the Hessian matrix the precision of wavefront aberration is significantly improved when evaluated up to the quadratic term of the Taylor series expansion. The methodology proposed in this study not only provides the means to investigate the principal curvatures of the wavefront along a ray, but also yields the information required to determine the irradiance and caustics of both axisymmetric and nonaxisymmetric optical systems.
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