U-quadratic distribution: Difference between revisions

Latest revision as of 19:47, 25 June 2024

In probability theory and statistics, the U-quadratic distribution is a continuous probability distribution defined by a unique convex quadratic function with lower limit a and upper limit b.

f (x | a, b, α, β) = α {(x - β)}^{2}, for x \in [a, b] .

Parameter relations

This distribution has effectively only two parameters a, b, as the other two are explicit functions of the support defined by the former two parameters:

β = \frac{b + a}{2}

(gravitational balance center, offset), and

α = \frac{12}{{(b - a)}^{3}}

(vertical scale).

Related distributions

One can introduce a vertically inverted ( $\cap$ )-quadratic distribution in analogous fashion. That inverted distribution is also closely related to the Epanechnikov distribution.

Applications

This distribution is a useful model for symmetric bimodal processes. Other continuous distributions allow more flexibility, in terms of relaxing the symmetry and the quadratic shape of the density function, which are enforced in the U-quadratic distribution – e.g., beta distribution and gamma distribution.

Moment generating function

M_{X} (t) = \frac{- 3 (e^{a t} (4 + (a^{2} + 2 a (- 2 + b) + b^{2}) t) - e^{b t} (4 + (- 4 b + (a + b)^{2}) t))}{(a - b)^{3} t^{2}}

Characteristic function

ϕ_{X} (t) = \frac{3 i (e^{i a t e^{i b t}} (4 i - (- 4 b + (a + b)^{2}) t))}{(a - b)^{3} t^{2}}

Template:ProbDistributions

U-quadratic distribution: Difference between revisions

Latest revision as of 19:47, 25 June 2024

Contents

Parameter relations

Related distributions

Applications

Moment generating function

Characteristic function

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U-quadratic distribution: Difference between revisions

Latest revision as of 19:47, 25 June 2024

Parameter relations

Related distributions

Applications

Moment generating function

Characteristic function

Navigation menu

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