New computation methods for geometrical optics /

New computation methods for geometrical optics /

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Bibliographic Details
Author / Creator:	Lin, P. D. (Psang Dain), author.
Imprint:	Singapore : Springer, [2013?] ©2014
Description:	1 online resource (xii, 239 pages) : illustrations (some color).
Language:	English
Series:	Springer series in optical sciences, 0342-4111 ; volume 178 Springer series in optical sciences ; v. 178.
Subject:	Geometrical optics -- Mathematics. Geometrical optics -- Mathematics.
Format:	E-Resource Book
URL for this record:	http://pi.lib.uchicago.edu/1001/cat/bib/11081142

Hidden Bibliographic Details
ISBN:	9789814451796 9814451797 9789814451789
Notes:	Includes bibliographical references. Online resource; title from PDF title page (SpringerLink, viewed October 7, 2013).
Summary:	This book employs homogeneous coordinate notation to compute the first- and second-order derivative matrices of various optical quantities. It will be one of the important mathematical tools for automatic optical design. The traditional geometrical optics is based on raytracing only. It is very difficult, if possible, to compute the first- and second-order derivatives of a ray and optical path length with respect to system variables, since they are recursive functions. Consequently, current commercial software packages use a finite difference approximation methodology to estimate these derivatives for use in optical design and analysis. Furthermore, previous publications of geometrical optics use vector notation, which is comparatively awkward for computations for non-axially symmetrical systems.
Standard no.:	10.1007/978-981-4451-79-6

Table of Contents:

Homogeneous coordinate notation
Skew-Ray Tracing at Boundary Surfaces
Modeling an Optical System
Paraxial Optics for Axis-Symmetrical Systems
The Jacobian Matrix of a Ray with respect to System Variable Vector
Point Spread Function and Modulation Transfer Function
Optical Path Length and Its Jacobian Matrix with respect to System Variable Vector
The Wavefront Shape, Irradiance, and Caustic Surface in an Optical System.