论文信息 - Alternative representation of the linear canonical integral transform.

Alternative representation of the linear canonical integral transform.

Starting with the Iwasawa-type decomposition of a first-order optical system (or ABCD system) as a cascade of a lens, a magnifier, and an orthosymplectic system (a system that is both symplectic and orthogonal), a further decomposition of the orthosymplectic system in the form of a separable fractional Fourier transformer embedded between two spatial-coordinate rotators is proposed. The resulting decomposition of the entire first-order optical system then shows a physically attractive representation of the linear canonical integral transformation, which, in contrast to Collins integral, is valid for any ray transformation matrix.

Tatiana Alieva | M. Bastiaans | T. Alieva | Martin J Bastiaans | M. J. Bastiaans

[1] S. A. Collins. Lens-System Diffraction Integral Written in Terms of Matrix Optics , 1970 .

[2] Christiane Quesne,et al. Linear Canonical Transformations and Their Unitary Representations , 1971 .

[3] Kurt Bernardo Wolf,et al. Geometric Optics on Phase Space , 2004 .

[4] N. Mukunda,et al. Iwasawa decomposition in first-order optics: universal treatment of shape-invariant propagation for coherent and partially coherent beams. , 1998 .

[5] F. H. Kerr,et al. On Namias's fractional Fourier transforms , 1987 .

[6] V. Namias. The Fractional Order Fourier Transform and its Application to Quantum Mechanics , 1980 .

[7] Z. Zalevsky,et al. The Fractional Fourier Transform: with Applications in Optics and Signal Processing , 2001 .

[8] Haldun M. Özaktas,et al. The fractional fourier transform , 2001, 2001 European Control Conference (ECC).

[9] R. K. Luneburg,et al. Mathematical Theory of Optics , 1966 .