Generalized inverse Gaussian distribution probability theory and statistics , the generalized inverse Gaussian distribution is a three-parameter family of continuous probability distributions with probability density function Kp is a modified Bessel function of the second kind , a > 0, b > 0 and p a real parameter. It is used extensively in geostatistics , statistical linguistics , finance , etc. This distribution was first proposed by Étienne Halphen . Ole Barndorff-Nielsen , who called it the generalized inverse Gaussian distribution. It is also known as the Sichel distribution , after Herbert Sichel . Its statistical properties are discussed in Bent Jørgensen's lecture notes.Properties Alternative parametrization By setting and, we can alternatively express the GIG distribution asconcentration parameter while is the scaling parameter.Summation Barndorff-Nielsen and Halgreen proved that the GIG distribution is infinitely divisible .Entropy The entropy of the generalized inverse Gaussian distribution is given asmodified Bessel function of the second kind with respect to the order evaluated atRelated distributions Special cases The inverse Gaussian and gamma distributions are special cases of the generalized inverse Gaussian distribution for p = −1/2 and b = 0, respectively. Specifically, an inverse Gaussian distribution of the formGamma distribution of the forminverse-gamma distribution , for a = 0, and the hyperbolic distribution , for p = 0.The GIG distribution is conjugate to the normal distribution when serving as the mixing distribution in a normal variance-mean mixture . Let the prior distribution for some hidden variable , say, be GIG:observed data points,, with normal likelihood function , conditioned on
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