Lévy distribution

The probability density function of the Lévy distribution over the domain ${\displaystyle x\geq \mu }$ is

${\displaystyle f(x;\mu ,c)={\sqrt {\frac {c}{2\pi }}}~~{\frac {e^{-{\frac {c}{2(x-\mu )}}}}{(x-\mu )^{3/2}}}}$

where ${\displaystyle \mu }$ is the location parameter and ${\displaystyle c}$ is the scale parameter. The cumulative distribution function is

${\displaystyle F(x;\mu ,c)={\textrm {erfc}}\left({\sqrt {\frac {c}{2(x-\mu )}}}\right)}$

where ${\displaystyle {\textrm {erfc}}(z)}$ is the complementary error function. The shift parameter ${\displaystyle \mu }$ has the effect of shifting the curve to the right by an amount ${\displaystyle \mu }$, and changing the support to the interval [${\displaystyle \mu }$, ${\displaystyle \infty }$). Like all stable distributions, the Levy distribution has a standard form f(x;0,1) which has the following property:

${\displaystyle f(x;\mu ,c)dx=f(y;0,1)dy\,}$

where y is defined as

${\displaystyle y={\frac {x-\mu }{c}}\,}$

The characteristic function of the Lévy distribution is given by

${\displaystyle \varphi (t;\mu ,c)=e^{i\mu t-{\sqrt {-2ict}}}.}$

Note that the characteristic function can also be written in the same form used for the stable distribution with ${\displaystyle \alpha =1/2}$ and ${\displaystyle \beta =1}$:

${\displaystyle \varphi (t;\mu ,c)=e^{i\mu t-|ct|^{1/2}~(1-i~{\textrm {sign}}(t))}.}$

Assuming ${\displaystyle \mu =0}$, the nth moment of the unshifted Lévy distribution is formally defined by:

${\displaystyle m_{n}\ {\stackrel {\mathrm {def} }{=}}\ {\sqrt {\frac {c}{2\pi }}}\int _{0}^{\infty }{\frac {e^{-c/2x}\,x^{n}}{x^{3/2}}}\,dx}$

which diverges for all ${\displaystyle n\geq 0.5}$ so that the integer moments of the Lévy distribution do not exist (only some fractional moments).

The moment generating function would be formally defined by:

${\displaystyle M(t;c)\ {\stackrel {\mathrm {def} }{=}}\ {\sqrt {\frac {c}{2\pi }}}\int _{0}^{\infty }{\frac {e^{-c/2x+tx}}{x^{3/2}}}\,dx}$

however this diverges for ${\displaystyle t>0}$ and is therefore not defined on an interval around zero, so the moment generating function is not defined per se.

Like all stable distributions except the normal distribution, the wing of the probability density function exhibits heavy tail behavior falling off according to a power law:

${\displaystyle f(x;\mu ,c)\sim {\sqrt {\frac {c}{2\pi }}}{\frac {1}{x^{3/2}}}}$   as   ${\displaystyle x\to \infty ,}$

which shows that Lévy is not just heavy-tailed but also fat-tailed. This is illustrated in the diagram below, in which the probability density functions for various values of c and ${\displaystyle \mu =0}$ are plotted on a log–log plot.

Probability density function for the Lévy distribution on a log–log plot

The standard Lévy distribution satisfies the condition of being stable

${\displaystyle (X_{1}+X_{2}+\dotsb +X_{n})\sim n^{1/\alpha }X}$,

where ${\displaystyle X_{1},X_{2},\ldots ,X_{n},X}$ are independent standard Lévy-variables with ${\displaystyle \alpha =1/2}$.

• If ${\displaystyle X\,\sim \,{\textrm {Levy}}(\mu ,c)}$ then ${\displaystyle kX+b\,\sim \,{\textrm {Levy}}(k\mu +b,kc)}$
• If ${\displaystyle X\,\sim \,{\textrm {Levy}}(0,c)}$ then ${\displaystyle X\,\sim \,{\textrm {Inv-Gamma}}({\tfrac {1}{2}},{\tfrac {c}{2}})}$ (inverse gamma distribution)
  Here, the Lévy distribution is a special case of a Pearson type V distribution
• If ${\displaystyle \,Y\,\sim \,{\textrm {Normal}}(\mu ,\sigma )}$ (Normal distribution) then ${\displaystyle {(Y-\mu )}^{-2}\,\sim \,{\textrm {Levy}}(0,1/\sigma ^{2})}$
• If ${\displaystyle X\,\sim \,{\textrm {Normal}}(\mu ,{\tfrac {1}{\sqrt {\sigma }}})}$ then ${\displaystyle {(X-\mu )}^{-2}\,\sim \,{\textrm {Levy}}(0,\sigma )}$
• If ${\displaystyle X\,\sim \,{\textrm {Levy}}(\mu ,c)}$ then ${\displaystyle X\,\sim \,{\textrm {Stable}}(1/2,1,c,\mu )}$ (Stable distribution)
• If ${\displaystyle X\,\sim \,{\textrm {Levy}}(0,c)}$ then ${\displaystyle X\,\sim \,{\textrm {Scale-inv-}}\chi ^{2}(1,c)}$ (Scaled-inverse-chi-squared distribution)
• If ${\displaystyle X\,\sim \,{\textrm {Levy}}(\mu ,c)}$ then ${\displaystyle {(X-\mu )}^{-{\tfrac {1}{2}}}\sim \,{\textrm {FoldedNormal}}(0,1/{\sqrt {c}})}$ (Folded normal distribution)

Random samples from the Lévy distribution can be generated using inverse transform sampling. Given a random variate U drawn from the uniform distribution on the unit interval (0, 1], the variate X given by[1]

${\displaystyle X=F^{-1}(U)={\frac {c}{2(\Phi ^{-1}(1-U))^{2}}}+\mu }$

is Lévy-distributed with location ${\displaystyle \mu }$ and scale ${\displaystyle c}$. Here ${\displaystyle \Phi (x)}$ is the cumulative distribution function of the standard normal distribution.

• The frequency of geomagnetic reversals appears to follow a Lévy distribution
• The time of hitting a single point, at distance ${\displaystyle \alpha }$ from the starting point, by the Brownian motion has the Lévy distribution with ${\displaystyle c=\alpha ^{2}}$. (For a Brownian motion with drift, this time may follow an inverse Gaussian distribution, which has the Lévy distribution as a limit.)
• The length of the path followed by a photon in a turbid medium follows the Lévy distribution.[2]
• A Cauchy process can be defined as a Brownian motion subordinated to a process associated with a Lévy distribution.[3]

• "Information on stable distributions". Retrieved July 13, 2005. - John P. Nolan's introduction to stable distributions, some papers on stable laws, and a free program to compute stable densities, cumulative distribution functions, quantiles, estimate parameters, etc. See especially An introduction to stable distributions, Chapter 1

• Weisstein, Eric W. "Lévy Distribution". MathWorld.