Modeling of corneal surfaces with radial polynomials

Author

Iskander, D. Robert ; Morelande, Mark R. ; Collins, Michael J. ; Davis, Brett

Author_Institution

Sch. of Eng., Griffith Univ., Brisbane, Qld., Australia

Volume

49

Issue

4

fYear

2002

fDate

4/1/2002 12:00:00 AM

Firstpage

320

Lastpage

328

Abstract

We consider analytical modeling of the anterior corneal surface with a set of orthogonal basis functions that are a product of radial polynomials and angular functions. Several candidate basis functions were chosen from the repertoire of functions that are orthogonal in the unit circle and invariant in form with respect to rotation about the origin. In particular, it is shown that a set of functions that is referred herein as Bhatia-Wolf polynomials, represents a better and more robust alternative for modeling corneal elevation data than traditionally used Zernike polynomials. Examples of modeling corneal elevation are given for normal corneas and for abnormal corneas with significant distortion.

Keywords

eye; least mean squares methods; physiological models; polynomials; vision defects; Bhatia-Wolf polynomials; Zernike polynomials; aberrations; abnormal corneas; analytical modeling; angular functions; anterior corneal surface; corneal elevation; linear model; minimum mean square error; normal corneas; orthogonal basis functions; radial polynomials; videokeratoscopic data; Analytical models; Australia; Cornea; Distortion measurement; Ellipsoids; Optical surface waves; Polynomials; Robustness; Solid modeling; Surface fitting; Computer Simulation; Cornea; Corneal Topography; Humans; Models, Anatomic; Surface Properties;

fLanguage

English

Journal_Title

Biomedical Engineering, IEEE Transactions on

Publisher

ieee

ISSN

0018-9294

Type

jour

DOI

10.1109/10.991159

Filename

991159