Title :
Infinite-series representations associated with the bivariate rician distribution and their applications
Author :
Zogas, Dimitris A. ; Karagiannidis, George K.
Author_Institution :
Dept. of Electr. & Comput. Eng., Aristotle Univ. of Thessaloniki, Greece
Abstract :
Analytical expressions for the evaluation of the bivariate Rician cumulative distribution function (CDF), the covariance, and the characteristic function (CHF) are not known, despite their usefulness in wireless communications systems analysis. In this letter, motivated by the ability of the Rician model to describe fading in wireless communications, we derive infinite-series representations for the probability density function, the CDF, the covariance, and the CHF of two correlated Rician random variables. It is shown that the presented infinite-series expressions converge rapidly, and can be efficiently used to study several performance criteria for dual-diversity receivers operating over correlated Rician fading channels.
Keywords :
Rician channels; covariance analysis; wireless channels; Rician cumulative distribution function; Rician fading channel; Rician random variable; covariance; digital communication; dual-diversity receiver; infinite-series representation; probability density function; wireless communication system; Distribution functions; Diversity methods; Diversity reception; Nakagami distribution; Probability density function; Random variables; Rayleigh channels; Rician channels; Weibull fading channels; Wireless communication; Communications channels; Rician fading; correlated fading; digital communications; fading channels;
Journal_Title :
Communications, IEEE Transactions on
DOI :
10.1109/TCOMM.2005.858659
