Subexponential distribution (light-tailed)

Template:Short description Template:Refimprove In probability theory, one definition of a subexponential distribution is as a probability distribution whose tails decay at an exponential rate, or faster: a real-valued distribution ${\displaystyle 𝒟}$ is called subexponential if, for a random variable ${\displaystyle X\sim 𝒟}$,

${\displaystyle \mathbb{P}(|X|\ge x)=O(e^{-Kx})}$, for large ${\displaystyle x}$ and some constant ${\displaystyle K>0}$.

The subexponential norm, ${\displaystyle \Vert \cdot {\Vert }_{{\psi }_1}}$, of a random variable is defined by

${\displaystyle \Vert X{\Vert }_{{\psi }_1}:=\inf \{K>0\mid 𝔼(e^{|X|/K})\le 2\},}$ where the infimum is taken to be ${\displaystyle +\mathrm{\infty }}$ if no such ${\displaystyle K}$ exists.

This is an example of a Orlicz norm. An equivalent condition for a distribution ${\displaystyle 𝒟}$ to be subexponential is then that ${\displaystyle \Vert X{\Vert }_{{\psi }_1}<\mathrm{\infty }.}$Template:R

Subexponentiality can also be expressed in the following equivalent ways:Template:R

1. ${\displaystyle \mathbb{P}(|X|\ge x)\le 2e^{-Kx},}$ for all ${\displaystyle x\ge 0}$ and some constant ${\displaystyle K>0}$.
2. ${\displaystyle 𝔼(|X{|}^p{)}^{1/p}\le Kp,}$ for all ${\displaystyle p\ge 1}$ and some constant ${\displaystyle K>0}$.
3. For some constant ${\displaystyle K>0}$, ${\displaystyle 𝔼(e^{\lambda |X|})\le e^{K\lambda }}$ for all ${\displaystyle 0\le \lambda \le 1/K}$.
4. ${\displaystyle 𝔼(X)}$ exists and for some constant ${\displaystyle K>0}$, ${\displaystyle 𝔼(e^{\lambda (X-𝔼(X))})\le e^{K^2{\lambda }^2}}$ for all ${\displaystyle -1/K\le \lambda \le 1/K}$.
5. ${\displaystyle \sqrt{|X|}}$ is sub-Gaussian.

Template:Reflist

• High-Dimensional Statistics: A Non-Asymptotic Viewpoint, Martin J. Wainwright, Cambridge University Press, 2019, Template:ISBN.

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