Probability distribution
In probability and statistics, the inverse-chi-squared distribution (or inverted-chi-square distribution [ 1] continuous probability distribution of a positive-valued random variable. It is closely related to the chi-squared distribution . It is used in Bayesian inference as conjugate prior for the variance of the normal distribution .[ 2]
Definition
The inverse chi-squared distribution (or inverted-chi-square distribution[ 1] probability distribution of a random variable whose multiplicative inverse (reciprocal) has a chi-squared distribution .
If
X
{\displaystyle X}
ν ν -->
{\displaystyle \nu }
degrees of freedom then
1
/
X
{\displaystyle 1/X}
ν ν -->
{\displaystyle \nu }
The probability density function of the inverse chi-squared distribution is given by
f
(
x
;
ν ν -->
)
=
2
− − -->
ν ν -->
/
2
Γ Γ -->
(
ν ν -->
/
2
)
x
− − -->
ν ν -->
/
2
− − -->
1
e
− − -->
1
/
(
2
x
)
{\displaystyle f(x;\nu )={\frac {2^{-\nu /2}}{\Gamma (\nu /2)}}\,x^{-\nu /2-1}e^{-1/(2x)}}
In the above
x
>
0
{\displaystyle x>0}
ν ν -->
{\displaystyle \nu }
degrees of freedom parameter. Further,
Γ Γ -->
{\displaystyle \Gamma }
gamma function .
The inverse chi-squared distribution is a special case of the inverse-gamma distribution .
with shape parameter
α α -->
=
ν ν -->
2
{\displaystyle \alpha ={\frac {\nu }{2}}}
β β -->
=
1
2
{\displaystyle \beta ={\frac {1}{2}}}
chi-squared : If
X
∼ ∼ -->
χ χ -->
2
(
ν ν -->
)
{\displaystyle X\thicksim \chi ^{2}(\nu )}
Y
=
1
X
{\displaystyle Y={\frac {1}{X}}}
Y
∼ ∼ -->
Inv-
χ χ -->
2
(
ν ν -->
)
{\displaystyle Y\thicksim {\text{Inv-}}\chi ^{2}(\nu )}
scaled-inverse chi-squared : If
X
∼ ∼ -->
Scale-inv-
χ χ -->
2
(
ν ν -->
,
1
/
ν ν -->
)
{\displaystyle X\thicksim {\text{Scale-inv-}}\chi ^{2}(\nu ,1/\nu )\,}
X
∼ ∼ -->
inv-
χ χ -->
2
(
ν ν -->
)
{\displaystyle X\thicksim {\text{inv-}}\chi ^{2}(\nu )}
Inverse gamma with
α α -->
=
ν ν -->
2
{\displaystyle \alpha ={\frac {\nu }{2}}}
β β -->
=
1
2
{\displaystyle \beta ={\frac {1}{2}}}
Inverse chi-squared distribution is a special case of type 5 Pearson distribution
See also
References
^ a b Bernardo, J.M.; Smith, A.F.M. (1993) Bayesian Theory , Wiley (pages 119, 431) ISBN 0-471-49464-X
^ Gelman, Andrew; et al. (2014). "Normal data with a conjugate prior distribution". Bayesian Data Analysis (Third ed.). Boca Raton: CRC Press. pp. 67– 68. ISBN 978-1-4398-4095-5
External links
Discrete
with finite with infinite
Continuous
supported on a supported on a supported with support
Mixed
Multivariate Directional Degenerate singular Families
