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Proceedings Paper

Density of real-plane zeros of a light wave in a turbulent medium
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Paper Abstract

The probability-density function of the log-amplitude derivative was represented as regular part of Laurent series in a neighborhood of the point at infinity and then it was established that real-plane zeros exist only if asymptotic behavior of the probability-density function at infinity is inversely related to cube of the random variable. Therewith the density of points, where the light wave has zeros of any order, is determined by the coefficient with the index minus three of Laurent series for the probability-density function of the log-amplitude derivative. This result is reduced to known particular cases.

Paper Details

Date Published: 19 November 1999
PDF: 4 pages
Proc. SPIE 3983, Sixth International Symposium on Atmospheric and Ocean Optics, (19 November 1999); doi: 10.1117/12.370480
Show Author Affiliations
Valeri A. Tartakovski, Institute of Atmospheric Optics (Russia)


Published in SPIE Proceedings Vol. 3983:
Sixth International Symposium on Atmospheric and Ocean Optics
Gennadii G. Matvienko; Vladimir P. Lukin, Editor(s)

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