On the Twistability of Partially Coherent, Schell-model Sources
Abstract
In this paper, the problem of assessing the twistability of a given bona fide cross-spectral density is tackled for the class of Schell-model sources, whose shift-invariant degree of coherence is represented by a real and symmetric function, denoted as μ(-)=μ(). By employing an abstract operatorial language, the problem of determining the highly degenerate spectrum of a twisted operator Wu is addressed through a modal analysis based on the complete knowledge of the spectrum of the sole twist operator Tu, as found by R. Simon and N. Mukunda. [J. Opt. Soc. Am. A 15, 1361 (1998)]. To this end, the evaluation of the complete tensor of the matrix elements n','| Wu|n, is carried out within the framework of the so-called extended Wigner distribution function, a concept recently introduced by M. VanValkenburgh [J. Mod. Opt. 55, 3537 - 3549 (2008)]. As a nontrivial application of the algorithm developed here, the analytical determination of the spectrum of saturated twisted astigmatic Gaussian Schell-model sources is also presented.
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