DocumentCode
1558793
Title
Statistical theory of polarization dispersion in single mode fibers
Author
Foschini, G.J. ; Poole, C.D.
Author_Institution
AT&T Bell Lab., Holmdel, NJ, USA
Volume
9
Issue
11
fYear
1991
fDate
11/1/1991 12:00:00 AM
Firstpage
1439
Lastpage
1456
Abstract
An analytical characterization of polarization dispersion measurements is presented. The authors report the solution of Poole´s stochastic dynamical equation for the evolution of the polarization dispersion vector with fiber length. The authors extend this to a more complete description by considering small, second-order dispersion effects through the frequency derivative of the dispersion vector. The complete analytical solution is seen to accord with what were originally empirically derived features of the joint probability distribution of the polarization dispersion vector and its frequency derivatives. Among the analytically determined properties are the Gaussian probability densities of the three components of the dispersion vector, and the hyperbolic secant (soliton shaped) probability densities of the components of the derivative of the dispersion vector
Keywords
light polarisation; optical dispersion; optical fibres; statistical analysis; Gaussian probability densities; Poole´s stochastic dynamical equation; analytical characterization; complete analytical solution; fiber length; frequency derivative; joint probability distribution; polarization dispersion vector; second-order dispersion effects; single mode fibers; soliton shaped hyperbolic probability densities; statistical theory; Distortion measurement; Frequency; Laboratories; Optical distortion; Optical fiber polarization; Optical fiber theory; Optical propagation; Optical pulses; Polarization mode dispersion; Stress;
fLanguage
English
Journal_Title
Lightwave Technology, Journal of
Publisher
ieee
ISSN
0733-8724
Type
jour
DOI
10.1109/50.97630
Filename
97630
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