THESE - Université Ferhat Abbas de Sétif

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Chapitre I Théorie des faisceaux lasers et interférogrammes [19] C. Paré, P.-A. Bélanger, "Propagation law and quasi-invariance properties of the truncated second-order moment of a diffracted laser beam", Opt. Commun. 123, 679- 693, 1996. [20] R. Martinez-Herrero, P. M. Mejias, "Second-order spatial characterization of hardedge diffracted beams", Opt. Lett. 18, 1669–1671 ,1993. [21] R.Borghi, M.Santarsiero et R.Simon, "Shape invariance and a universal form for the Gouy phase", J. Opt. Soc. Am. A 21, 572-579 ,2004. [22] J.Alda, S.Wang, E.Bernabéu, "Analytical expression for the complex radius of curvature tensor Q for generalized Gaussian beams", Opt. Commun. 80, 350-352, 1991. [23] A.E.Siegman, "Defining the effective radius of curvature for a nonideal optical beam", IEEE J. Quantum Electron. 27, 1146-1148. 1991 [24] P.A.Bélanger, "Beam propagation and the ABCD ray matrices", Opt. Lett, 16, 196-198, 1991. [25] Y.Champagne, "Second-moment approach to the time-averaged spatial characterization of multipletransverse- mode laser beams", J. Opt. Soc. Am. A, 12, 1707-1714, 1995. [26] H. Weber, "Propagation of higher-order intensity moments in quadratic-index media", Opt. Quantum Electron. 24, S1027–S1049 ,1992. [27] G. Gbur, P. S. Carney, "Convergence criteria and optimization techniques for beam moments", Pure Appl. Opt. 7, 1221–1230, 1998. [28] M.A. Porras, R.Medina, "Entropy-based definition of laser beam spot size", Appl. Opt. 34, 8247- 8251, 1995. [29] M.A.Porras, J. Alda, E. Bernabéu, "Complex beam parameter and ABCD law for non-Gaussian and nonspherical light beams", Appl. Opt., 1992, 31, 6389-6402. [30] A.E. Siegman, "Laser beam quality-what’s it good for ?", Proceedings of the International Conference on LASERS, Charleston,USA,1995. [31] M.W.Sasnett, "Propagation of multimode laser beams - The M 2 factor", in The Physics and Technology of Laser Resonators, D. R. Hall et P. E. Jackson, éds., IOP Publishing, New York, chap. 9, pp. 132-142, 1989. [32] N.Reng, B.Eppich, "Definition and measurements of high-power laser beam parameters", Optical and Quantum Electronics 24, 973-992, 1992 [33] P.Bélanger, Y.Champagne, C. Paré, "Beam propagation factor of diffracted laser beams", Opt. Commun. 105, 233–242, 1994. 40
Chapitre I Théorie des faisceaux lasers et interférogrammes [34] J.Serna, P.M.Mejîas, R.Martínez-Herrero, "Beam quality changes of Gaussian Schell-model fields propagating through Gaussian apertures", App.opt / Vol. 31, No. 22 / 1 August 1992 [35] J.Serna, P.M.Mejias, R.Martinez-Herrero, Beam quality changes in Hermite-Gauss mode fields propagating through Gaussian apertures, App.opt / Vol. 32, No. 7 / 1 March 1993. [36] R. M. A. Azzam" Three-dimensional polarization states of monochromatic light fields", J. Opt. Soc. Am. A Vol. 28, No. 11, 2011. [37] P. Hariharan, "Optical Interferometry", Academic press, Second edition,2003. [38] Thomas R.Ferguson,"Polarization effects in interferograms of conical optical elements", App.opt Vol.21, No.3, 514-517, 1982. [39] C.Joenathan, B.Franze, P.Haible, and H.J.Tiziani, "Speckle interferometry with temporal phase evaluation for measuring large-object deformation", Appl. Opt.No.37, 1998. [40] K. Creath, "Phase-shifting speckle interferometry", Appl. Opt. No.24, 1985. [41] Cho Jui Tay, Chenggen Quan, and Lujie Chen, "Phase retrieval with a three-frame phase-shifting algorithm with an unknown phase shift", App.Opt Vol. 44, No. 8, 2005. [42] M.Takeda and K.Mutoh, "Fourier transform profilometry for the automatic measurement of 3-D object shapes" Appl. Opt. No.22, 1983. [43] C.Roddier, F.Roddier "Interferogram analysis using Fourier transform techniques", App.opt, Vol. 26, No. 9 /, 1987. [44] V.G.Cooper, "Analysis of Fabry-Perot Interferograms by Means of Their Fourier Transforms", App.opt, Vol. 10, No. 3, 1971. [45] C.Gorecki, "Interferogram analysis using a Fourier transform method for automatic 3D surface measurement", Pure Appl. Opt. No.1, 1992. [46] N.Brock, J.Hayes, B.Kimbrough, J.Millerd, M. North-Morris, M.Novak and J.C. Wyant, "Dynamic Interferometry", Proceeding of Spie Vol.58750, Bellingham 2005. [47] José A. Ferrari and Eugenio Garbusi, "Phase-shifting (Sagnac) interferometer with external phase control" App.Opt, Vol. 44, No. 21, 2005. [48] J.Min, B.Yao, P.Gao, B.Ma, S.Yan, F.Peng, J.Zheng, T.Ye, R.Rupp "Wave-front curvature compensation of polarization phase-shifting digital holography", Optik 2011, article in press. 41
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Page 3 and 4: Table des matières Introduction G
Page 5 and 6: III.5 Conclusion Bibliographie Chap
Page 7 and 8: w0=1mm. Figure II.4: Evolution de C
Page 9 and 10: Introduction générale Depuis sa c
Page 11 and 12: manifestent sous forme d'anneaux co
Page 13 and 14: Chapitre I Théorie des faisceaux l
Page 47: Chapitre I Théorie des faisceaux l
Page 51 and 52: Chapitre II Analyse et déterminati
Page 65 and 66: Chapitre III Amélioration de la su
Page 85 and 86: Chapitre IV Mesure de la distributi
Page 87 and 88: Chapitre IV z=140mm Mesure de la di
Page 95 and 96: Chapitre IV phase 35 30 25 20 15 10
Page 97 and 98: Chapitre IV Bibliographie Mesure de
Page 99 and 100:
transversale. On a constaté aussi
Page 101 and 102:
print*,'entrer RSZ' read(*,*)RSZ c
Page 103 and 104:
CALL dqdag(FEIM,Xa,Xb,ERRABS,ERRREL
Page 105 and 106:
EL1=1.0D0 EL2=1.0D0-XX IF(LL.EQ.1)
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THESE - Université Ferhat Abbas de Sétif

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