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Sum and difference of two squared correlated Nakagami variates in connection with the McKay distribution
By: Holm, H.; Alouini, M.-S.;
2004 / IEEE
Description
This item was taken from the IEEE Periodical ' Sum and difference of two squared correlated Nakagami variates in connection with the McKay distribution ' General formulas for the probability density function of the sum and the difference of two correlated, not necessarily identically distributed, squared Nakagami variates (or equivalently, gamma variates) are derived. These expressions are shown to be in the form of the McKay ""Bessel function"" distributions. In addition, formulas for the moments of these distributions, in terms of the Gauss hypergeometric function, are provided. An application of these new results relevant to the calculation of outage probability in the presence of self-interference is discussed.
Related Topics
Fading Channels
Bessel Functions
Gamma Distribution
Nakagami Fading
Squared Correlated Nakagami Variates
Mckay Distribution
Probability Density Function
Gamma Variates
Gauss Hypergeometric Function
Outage Probability
Self-interference
Nakagami Distribution
Fading
Probability Density Function
Rayleigh Channels
Statistical Distributions
Gaussian Distribution
Distributed Computing
Power System Modeling
Performance Analysis
Probability
Communication, Networking And Broadcast Technologies
Engineering
Bessel Function Distribution
