Champernowne distribution statistics , the Champernowne distribution is a symmetric, continuous probability distribution , describing random variables that take both positive and negative values . It is a generalization of the logistic distribution that was introduced by D. G. Champernowne. Champernowne developed the distribution to describe the logarithm of income.Definition The Champernowne distribution has a probability density function given byn is the normalizing constant , which depends on the parameters. The density may be rewritten asProperties The density f defines a symmetric distribution with median y 0 , which has tails somewhat heavier than a normal distribution .Special cases In the special case it is the Burr Type XII density.Y , the logarithm of income, has a Champernowne distribution, then the density function of the income X = exp is x 0 = exp is the median income . If λ = 1, this distribution is often called the Fisk distribution , which has density
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