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Mathematical properties of describing freeform optical surfaces with orthogonal bases
Author(s): Nick Takaki; Jannick P. Rolland
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Paper Abstract

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.

Paper Details

Date Published: 27 November 2017
PDF: 7 pages
Proc. SPIE 10590, International Optical Design Conference 2017, 105900U (27 November 2017); doi: 10.1117/12.2292913
Show Author Affiliations
Nick Takaki, Univ. of Rochester (United States)
Jannick P. Rolland, Univ. of Rochester (United States)


Published in SPIE Proceedings Vol. 10590:
International Optical Design Conference 2017
Peter P. Clark; Julius A. Muschaweck; Richard N. Pfisterer; John R. Rogers, Editor(s)

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