Q-exponential distribution

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Template:Probability distribution

The Lomax distribution, conditionally also called the Pareto Type II distribution, is a heavy-tail probability distribution often used in business, economics, and actuarial modeling.[1][2] It is named after K. S. Lomax. It is essentially a Pareto distribution that has been shifted so that its support begins at zero.[3]

Characterization

Probability density function

The probability density function for the Lomax distribution is given by

p(x)=αλ[1+xλ](α+1),x0,

with shape parameter α>0 and scale parameter λ>0. The density can be rewritten in such a way that more clearly shows the relation to the Pareto Type I distribution. That is:

p(x)=αλα(x+λ)α+1.

Relation to the Pareto distribution

The Lomax distribution is a Pareto Type I distribution shifted so that its support begins at zero. Specifically:

If YPareto(xm=λ,α), then YxmLomax(λ,α).

The Lomax distribution is a Pareto Type II distribution with xm=λ and μ=0:Template:Cn

If XLomax(λ,α) then XP(II)(xm=λ,α,μ=0).

Relation to generalized Pareto distribution

The Lomax distribution is a special case of the generalized Pareto distribution. Specifically:

μ=0,ξ=1α,σ=λα.

Relation to q-exponential distribution

The Lomax distribution is a special case of the q-exponential distribution. The q-exponential extends this distribution to support on a bounded interval. The Lomax parameters are given by:

α=2qq1,λ=1λq(q1).

Non-central moments

The νth non-central moment E[Xν] exists only if the shape parameter α strictly exceeds ν, when the moment has the value

E(Xν)=λνΓ(αν)Γ(1+ν)Γ(α)

See also

References

  1. Lomax, K. S. (1954) "Business Failures; Another example of the analysis of failure data". Journal of the American Statistical Association, 49, 847–852. Template:Jstor
  2. Johnson, N.L., Kotz, S., Balakrishnan, N. (1994) Continuous Univariate Distributions, Volume 1, 2nd Edition, Wiley. ISBN 0-471-58495-9 (pages 575, 602)
  3. Van Hauwermeiren M and Vose D (2009). A Compendium of Distributions [ebook]. Vose Software, Ghent, Belgium. Available at www.vosesoftware.com. Accessed 07/07/11

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