Smoothness (probability theory) - Alchetron, the free social encyclopedia

In probability theory and statistics, smoothness of a density function is a measure which determines how many times the density function can be differentiated, or equivalently the limiting behavior of distribution’s characteristic function.

Formally, we call the distribution of a random variable X ordinary smooth of order β if its characteristic function satisfies

d 0 | t | − β ≤ φ X ( t ) ≤ d 1 | t | − β as t → ∞

for some positive constants d₀, d₁, β. The examples of such distributions are gamma, exponential, uniform, etc.

The distribution is called supersmooth of order β if its characteristic function satisfies

d 0 | t | β 0 exp ⁡ ( − | t | β / γ ) ≤ φ X ( t ) ≤ d 1 | t | β 1 exp ⁡ ( − | t | β / γ ) as t → ∞

for some positive constants d₀, d₁, β, γ and constants β₀, β₁. Such supersmooth distributions have derivatives of all orders. Examples: normal, Cauchy, mixture normal.

References

Smoothness (probability theory) Wikipedia

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