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J Opt Soc Am A Opt Image Sci Vis. 2009 Apr;26(4):783-93.

Pseudopolar decomposition of the Jones and Mueller-Jones exponential polarization matrices.

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  • 1FEMAN Group, Departament de Física Aplicada i Optica, Universitat de Barcelona, C/ Martí i Franquès 1, Barcelona 08030, Spain. oarteaga@ub.edu

Abstract

We propose a new algorithm, the pseudopolar decomposition, to decompose a Jones or a Mueller-Jones matrix into a sequence of matrix factors: J congruent withJ(R)J(D)J(1C)J(2C) or M congruent withM(R)M(D)M(1C)M(2C). The matrices J(R)(M(R)) and J(D)(M(D)) parameterize, respectively, the retardation and dichroic properties of J(M) in a good approximation, while J(iC)(M(iC)) are correction factors that arise from the noncommutativity of the polarization properties. The exponential versions of the general Jones matrix are used to demonstrate the pseudopolar decomposition and to calculate each one of the matrix factors. The decomposition preserves all the polarization properties of the system on the factorized J(R)(M(R)) and J(D)(M(D)) matrix terms. The algorithm that calculates the pseudopolar decomposition for experimentally determined Mueller matrices is presented.

PMID:
19340253
[PubMed]
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