Noncentral chi distribution

Noncentral chi

Parameters	${\displaystyle k>0}$ degrees of freedom ${\displaystyle \lambda >0}$
Support	${\displaystyle x\in [0;+\mathrm{\infty })}$
PDF	${\displaystyle \frac{e^{-(x^2+{\lambda }^2)/2}{x}^k\lambda }{(\lambda x{)}^{k/2}}{I}_{k/2-1}(\lambda x)}$
CDF	${\displaystyle 1-Q_{\frac{k}{2}}(\lambda ,x)}$ with Marcum Q-function ${\displaystyle Q_M(a,b)}$
Mean	${\displaystyle \sqrt{\frac{\pi }{2}}{L}_{1/2}^{(k/2-1)}\left(\frac{-{\lambda }^2}{2}\right)}$
Variance	${\displaystyle k+{\lambda }^2-{\mu }^2}$, where ${\displaystyle \mu }$ is the mean

In probability theory and statistics, the noncentral chi distribution^[1] is a noncentral generalization of the chi distribution. It is also known as the generalized Rayleigh distribution.

If ${\displaystyle X_i}$ are k independent, normally distributed random variables with means ${\displaystyle {\mu }_i}$ and variances ${\displaystyle {\sigma }_i^2}$, then the statistic

${\displaystyle Z=\sqrt{{\displaystyle \sum _{i=1}^k}{\left(\frac{X_i}{{\sigma }_i}\right)}^2}}$

is distributed according to the noncentral chi distribution. The noncentral chi distribution has two parameters: ${\displaystyle k}$ which specifies the number of degrees of freedom (i.e. the number of ${\displaystyle X_i}$), and ${\displaystyle \lambda }$ which is related to the mean of the random variables ${\displaystyle X_i}$ by:

${\displaystyle \lambda =\sqrt{{\displaystyle \sum _{i=1}^k}{\left(\frac{{\mu }_i}{{\sigma }_i}\right)}^2}}$

The probability density function (pdf) is

${\displaystyle f(x;k,\lambda )=\frac{e^{-(x^2+{\lambda }^2)/2}{x}^k\lambda }{(\lambda x{)}^{k/2}}{I}_{k/2-1}(\lambda x)}$

where ${\displaystyle I_{\nu }(z)}$ is a modified Bessel function of the first kind.

The first few raw moments are:

${\displaystyle {\mu }_1^{\text{'}}=\sqrt{\frac{\pi }{2}}{L}_{1/2}^{(k/2-1)}\left(\frac{-{\lambda }^2}{2}\right)}$

${\displaystyle {\mu }_2^{\text{'}}=k+{\lambda }^2}$

${\displaystyle {\mu }_3^{\text{'}}=3\sqrt{\frac{\pi }{2}}{L}_{3/2}^{(k/2-1)}\left(\frac{-{\lambda }^2}{2}\right)}$

${\displaystyle {\mu }_4^{\text{'}}=(k+{\lambda }^2{)}^2+2(k+2{\lambda }^2)}$

where ${\displaystyle L_n^{(a)}(z)}$ is a Laguerre function. Note that the 2${\displaystyle n}$th moment is the same as the ${\displaystyle n}$th moment of the noncentral chi-squared distribution with ${\displaystyle \lambda }$ being replaced by ${\displaystyle {\lambda }^2}$.

Let ${\displaystyle X_j=(X_{1j},X_{2j}),j=1,2,\dots n}$, be a set of n independent and identically distributed bivariate normal random vectors with marginal distributions ${\displaystyle N({\mu }_i,{\sigma }_i^2),i=1,2}$, correlation ${\displaystyle \rho }$, and mean vector and covariance matrix

${\displaystyle E(X_j)=\mu =({\mu }_1,{\mu }_2{)}^T,\mathrm{\Sigma }=\left[\begin{array}{cc}{\sigma }_{11}& {\sigma }_{12}\\ {\sigma }_{21}& {\sigma }_{22}\end{array}\right]=\left[\begin{array}{cc}{\sigma }_1^2& \rho {\sigma }_1{\sigma }_2\\ \rho {\sigma }_1{\sigma }_2& {\sigma }_2^2\end{array}\right],}$

with ${\displaystyle \mathrm{\Sigma }}$ positive definite. Define

${\displaystyle U={\left[{\displaystyle \sum _{j=1}^n}\frac{X_{1j}^2}{{\sigma }_1^2}\right]}^{1/2},V={\left[{\displaystyle \sum _{j=1}^n}\frac{X_{2j}^2}{{\sigma }_2^2}\right]}^{1/2}.}$

Then the joint distribution of U, V is central or noncentral bivariate chi distribution with n degrees of freedom.^[2][3] If either or both ${\displaystyle {\mu }_1\ne 0}$ or ${\displaystyle {\mu }_2\ne 0}$ the distribution is a noncentral bivariate chi distribution.

• If ${\displaystyle X}$ is a random variable with the non-central chi distribution, the random variable ${\displaystyle X^2}$ will have the noncentral chi-squared distribution. Other related distributions may be seen there.
• If ${\displaystyle X}$ is chi distributed: ${\displaystyle X\sim {\chi }_k}$ then ${\displaystyle X}$ is also non-central chi distributed: ${\displaystyle X\sim NC{\chi }_k(0)}$. In other words, the chi distribution is a special case of the non-central chi distribution (i.e., with a non-centrality parameter of zero).
• A noncentral chi distribution with 2 degrees of freedom is equivalent to a Rice distribution with ${\displaystyle \sigma =1}$.
• If X follows a noncentral chi distribution with 1 degree of freedom and noncentrality parameter λ, then σX follows a folded normal distribution whose parameters are equal to σλ and σ² for any value of σ.

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