kw.\*:("Polynôme Zernike")
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A COMPARISON, USING ORTHOGONAL COEFFICIENTS, OF TWO FORMS OF ABERRATION BALANEING.WOODRUFF CJ.1975; OPT. ACTA; G.B.; DA. 1975; VOL. 22; NO 11; PP. 933-941; BIBL. 5 REF.Article
DETERMINATION DES COEFFICIENTS DU DEVELOPPEMENT DE L'ABERRATION D'ONDE SELON LES POLYNOMES DE ZERNIKEBEZDIL'KO CN.1975; OPT.-MEKH. PROMYSHL.; S.S.S.R.; DA. 1975; VOL. 42; NO 7; PP. 75-76; BIBL. 9 REF.Article
Analysis of Absolute Testing based on Even-Odd Functions by Zernike polynomialsJIA XIN; XING TINGWEN; LIN WUMEI et al.Proceedings of SPIE, the International Society for Optical Engineering. 2010, Vol 7656, issn 0277-786X, isbn 978-0-8194-8086-6, 76563E.1-76563E.6, 3Conference Paper
Zernike polynomial fitting fails to represent all visually significant corneal aberrationsSMOLEK, Michael K; KLYCE, Stephen D.Investigative ophthalmology & visual science. 2003, Vol 44, Num 11, pp 4676-4681, issn 0146-0404, 6 p.Article
Overlay error due to lens coma and asymmetric illumination dependence on pattern featureNOMURA, H; SATO, T.SPIE proceedings series. 1998, pp 199-210, isbn 0-8194-2777-2Conference Paper
Demodulation of a single-image interferogram using a Zernike-polynomial-based phase-fitting technique with a differential evolution algorithmCHAO TIAN; YONGYING YANG; TAO WEI et al.Optics letters. 2011, Vol 36, Num 12, pp 2318-2320, issn 0146-9592, 3 p.Article
The contribution of high order Zernike modes to wavefront tiltTEN BRUMMELAAR, T. A.Optics communications. 1995, Vol 115, Num 5-6, pp 417-424, issn 0030-4018Article
Variable aberration generators using rotated Zernike platesACOSTA, Eva; BARA, Salvador.Journal of the Optical Society of America. A, Optics, image science, and vision (Print). 2005, Vol 22, Num 9, pp 1993-1996, issn 1084-7529, 4 p.Article
METHODE NUMERIQUE DE CALCUL DU COEFFICIENT DE STREHL A L'AIDE DES POLYNOMES DE ZERNIKEBEZDID'KO SN.1976; OPT.-MEKH. PROMYSHL.; S.S.S.R.; DA. 1976; VOL. 43; NO 4; PP. 22-25; BIBL. 12 REF.Article
ON THE MATHEMATICAL PROPERTIES OF THE ZERNIKE POLYNOMIALS.KINTNER EC.1976; OPT. ACTA; G.B.; DA. 1976; VOL. 23; NO 8; PP. 679-680; BIBL. 5 REF.Article
A RECURRENCE RELATION FOR CALCULATING THE ZERNIKE POLYNOMIALS.KINTNER EC.1976; OPT. ACTA; G.B.; DA. 1976; VOL. 23; NO 6; PP. 499-500; BIBL. 3 REF.Article
NEW TECHNIQUE FOR CONTROLLING OPTICAL MIRROR SHAPES.SCOTT RM.1975; OPT. ENGNG; U.S.A.; DA. 1975; VOL. 14; NO 2; PP. 112-115; BIBL. 6 REF.Article
Zernike-based matrix model of deformable mirrors : optimization of aperture sizeALDA, L; BOREMAN, G. D.Applied optics. 1993, Vol 32, Num 13, pp 2431-2438, issn 0003-6935Article
Beitrag zur Verwendung von Zernike-Polynomen bei der automatischen Interferenzstreifenauswertung = Contribution à l'analyse automatique des franges en utilisant les polynômes de Zernike = Contribution to the automatic fringe analysis using Zernike polynomialsKÜCHEL, F. M; SCHMIEDER, T; TIZIANI, H. J et al.Optik (Stuttgart). 1983, Vol 65, Num 2, pp 123-142, issn 0030-4026Article
Image description with generalized pseudo-Zernike momentsTING XIA; HONGQING ZHU; HUAZHONG SHU et al.Journal of the Optical Society of America. A, Optics, image science, and vision (Print). 2007, Vol 24, Num 1, pp 50-59, issn 1084-7529, 10 p.Article
Zernike annular polynomials for imaging systems with annular pupilsMAHAJAN, V. N.Journal of the Optical Society of America A, Optics and image science. 1984, Vol 1, Num 6, 685Article
ZERNIKE ANNULAR POLYNOMIALS FOR IMAGING SYSTEMS WITH ANNULAR PUPILSMAHAJAN VN.1981; J. OPT. SOC. AM. (1930); ISSN 0030-3941; USA; DA. 1981; VOL. 71; NO 1; PP. 75-85; BIBL. 28 REF.Article
CONVERSION OF ZERNICKE ABERRATION COEFFICIENTS TO SEIDEL AND HIGHER-ORDER POWER-SERIES ABERRATION COEFFICIENTSTYSON RK.1982; OPT. LETT.; ISSN 0146-9592; USA; DA. 1982; VOL. 7; NO 6; PP. 262-264; BIBL. 1 REF.Article
WAVE-FRONT INTREPRETATION WITH ZERNIKE POLYNOMIALSWANG JY; SILVA DE.1980; APPL. OPT.; USA; DA. 1980; VOL. 19; NO 9; PP. 1510-1518; BIBL. 18 REF.Article
DIFFRACTION OF UNIFORM AND GAUSSIAN BEAMS: AN APPLICATION OF ZERNIKE POLYNOMIALS.SILLITTO RM.1977; OPTIK; DTSCH.; DA. 1977; VOL. 48; NO 3; PP. 271-277; ABS. ALLEM.; BIBL. 17 REF.Article
SOME COMMENTS ON THE USE OF THE ZERNIKE POLYNOMIALS IN OPTICS.KINTNER EC.1976; OPT. COMMUNIC.; NETHERL.; DA. 1976; VOL. 18; NO 3; PP. 235-237; BIBL. 6 REF.Article
Rotating pairs of Zernike phase plates for compensating for the higher-order aberrations of the human eyeHONGWEI ZHANG; AGOPOV, Mikael; LA SCHIAZZA, Olivier et al.Journal of modern optics (Print). 2008, Vol 55, Num 4-5, pp 727-735, issn 0950-0340, 9 p.Article
Gram-Schmidt orthogonalization of the Zernike polynomials on apertures of arbitrary shapeUPTON, Robert; ELLERBROEK, Brent.Optics letters. 2004, Vol 29, Num 24, pp 2840-2842, issn 0146-9592, 3 p.Article
High order multi-dimensional moment generating algorithm and the efficient computation of Zernike momentsMOHAMMED SADIQ ABDUL-HAMEED.International conference on acoustics, speech, and signal processing. 1997, pp 3061-3064, isbn 0-8186-7919-0Conference Paper
The structure of Fraunhofer diffraction patterns of apertures with N-fold rotational symmetrySILLITTO, R. M.Optica acta. 1983, Vol 30, Num 11, pp 1525-1540, issn 0030-3909Article