Expand this Topic clickable element to expand a topic
Skip to content
Optica Publishing Group

Mathematical Properties of Describing Freeform Optical Surfaces with Orthogonal Bases

Not Accessible

Your library or personal account may give you access


Orthogonal polynomials offer several mathematical properties for describing freeform optical surfaces. To leverage these properties, their interaction with variables such as tip and tilt, base sphere and conic variables, and packaging variables must be understood.

© 2017 Optical Society of America

PDF Article
More Like This
Describing freeform surfaces with orthogonal functions

Dennis Ochse, Kristina Uhlendorf, and Lutz Reichmann
FT2B.4 Freeform Optics (Freeform) 2015

Aberration-Based Design Example for Freeform Optical Designs with Base Off-Axis Conics

Nick Takaki, Aaron Bauer, and Jannick P. Rolland
120781M International Optical Design Conference (IODC) 2021

Optical Design with Orthogonal Freeform Representatives

Christoph Menke
JW1B.4 Freeform Optics (Freeform) 2017


You do not have subscription access to this journal. Citation lists with outbound citation links are available to subscribers only. You may subscribe either as an Optica member, or as an authorized user of your institution.

Contact your librarian or system administrator
Login to access Optica Member Subscription

Select as filters

Select Topics Cancel
© Copyright 2022 | Optica Publishing Group. All Rights Reserved