RANDOM MATRIX THEORY APPROACH TO THE INTENSITY DISTRIBUTIONS OF WAVES   PROPAGATING IN A RANDOM MEDIUM

Eugene Kogan; Moshe Kaveh

arXiv:cond-mat/9502080·cond-mat·October 28, 2009

RANDOM MATRIX THEORY APPROACH TO THE INTENSITY DISTRIBUTIONS OF WAVES PROPAGATING IN A RANDOM MEDIUM

Eugene Kogan, Moshe Kaveh

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TL;DR

This paper applies random matrix theory to analyze the statistical properties of wave intensity distributions in quasi-one-dimensional random media, providing new distribution functions for transmission coefficients.

Contribution

It introduces a novel application of random matrix theory to derive distribution functions for wave transmission in random media.

Findings

01

Derived distribution functions for total and angular transmission coefficients.

02

Provided a theoretical framework for understanding wave propagation in disordered systems.

03

Enhanced understanding of intensity fluctuations in random media.

Abstract

Statistical properties of coherent radiation propagating in a quasi - 1D random media is studied in the framework of random matrix theory. Distribution functions for the total transmission coefficient and the angular transmission coefficient are obtained.

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