Kaniadakis Erlang distribution

κ-Erlang distribution
	Probability density function Plot of the κ-Erlang distribution for typical κ-values and n=1, 2,3. The case κ=0 corresponds to the ordinary Erlang distribution.
Parameters	;
Support
PDF
CDF

The Kaniadakis Erlang distribution (or κ-Erlang Gamma distribution) is a family of continuous statistical distributions, which is a particular case of the κ-Gamma distribution, when $\alpha =1$ and $\nu =n=$ positive integer.^[1] The first member of this family is the κ-exponential distribution of Type I. The κ-Erlang is a κ-deformed version of the Erlang distribution. It is one example of a Kaniadakis distribution.

Characterization

Probability density function

The Kaniadakis κ-Erlang distribution has the following probability density function:^[1]

f_{_{\kappa }}(x)={\frac {1}{(n-1)!}}\prod _{m=0}^{n}\left[1+(2m-n)\kappa \right]x^{n-1}\exp _{\kappa }(-x)

valid for $x\geq 0$ and $n={\textrm {positive}}\,\,{\textrm {integer}}$ , where $0\leq |\kappa |<1$ is the entropic index associated with the Kaniadakis entropy.

The ordinary Erlang Distribution is recovered as $\kappa \rightarrow 0$ .

Cumulative distribution function

The cumulative distribution function of κ-Erlang distribution assumes the form:^[1]

F_{\kappa }(x)={\frac {1}{(n-1)!}}\prod _{m=0}^{n}\left[1+(2m-n)\kappa \right]\int _{0}^{x}z^{n-1}\exp _{\kappa }(-z)dz

valid for $x\geq 0$ , where $0\leq |\kappa |<1$ . The cumulative Erlang distribution is recovered in the classical limit $\kappa \rightarrow 0$ .

Survival distribution and hazard functions

The survival function of the κ-Erlang distribution is given by:

$S_{\kappa }(x)=1-{\frac {1}{(n-1)!}}\prod _{m=0}^{n}\left[1+(2m-n)\kappa \right]\int _{0}^{x}z^{n-1}\exp _{\kappa }(-z)dz$

The survival function of the κ-Erlang distribution enables the determination of hazard functions in closed form through the solution of the κ-rate equation:

${\frac {S_{\kappa }(x)}{dx}}=-h_{\kappa }S_{\kappa }(x)$

where $h_{\kappa }$ is the hazard function.

Family distribution

A family of κ-distributions arises from the κ-Erlang distribution, each associated with a specific value of $n$ , valid for $x\geq 0$ and $0\leq |\kappa |<1$ . Such members are determined from the κ-Erlang cumulative distribution, which can be rewritten as:

F_{\kappa }(x)=1-\left[R_{\kappa }(x)+Q_{\kappa }(x){\sqrt {1+\kappa ^{2}x^{2}}}\right]\exp _{\kappa }(-x)

where

Q_{\kappa }(x)=N_{\kappa }\sum _{m=0}^{n-3}\left(m+1\right)c_{m+1}x^{m}+{\frac {N_{\kappa }}{1-n^{2}\kappa ^{2}}}x^{n-1}

R_{\kappa }(x)=N_{\kappa }\sum _{m=0}^{n}c_{m}x^{m}

with

N_{\kappa }={\frac {1}{(n-1)!}}\prod _{m=0}^{n}\left[1+(2m-n)\kappa \right]

c_{n}={\frac {n\kappa ^{2}}{1-n^{2}\kappa ^{2}}}

c_{n-1}=0

c_{n-2}={\frac {n-1}{(1-n^{2}\kappa ^{2})[1-(n-2)^{2}\kappa ^{2}]}}

c_{m}={\frac {(m+1)(m+2)}{1-m^{2}\kappa ^{2}}}c_{m+2}\quad {\textrm {for}}\quad 0\leq m\leq n-3

First member

The first member ( $n=1$ ) of the κ-Erlang family is the κ-Exponential distribution of type I, in which the probability density function and the cumulative distribution function are defined as:

f_{_{\kappa }}(x)=(1-\kappa ^{2})\exp _{\kappa }(-x)

F_{\kappa }(x)=1-{\Big (}{\sqrt {1+\kappa ^{2}x^{2}}}+\kappa ^{2}x{\Big )}\exp _{k}({-x)}

Second member

The second member ( $n=2$ ) of the κ-Erlang family has the probability density function and the cumulative distribution function defined as:

f_{_{\kappa }}(x)=(1-4\kappa ^{2})\,x\,\exp _{\kappa }(-x)

F_{\kappa }(x)=1-\left(2\kappa ^{2}x^{2}+1+x{\sqrt {1+\kappa ^{2}x^{2}}}\right)\exp _{k}({-x)}

Third member

The second member ( $n=3$ ) has the probability density function and the cumulative distribution function defined as:

f_{_{\kappa }}(x)={\frac {1}{2}}(1-\kappa ^{2})(1-9\kappa ^{2})\,x^{2}\,\exp _{\kappa }(-x)

F_{\kappa }(x)=1-\left\{{\frac {3}{2}}\kappa ^{2}(1-\kappa ^{2})x^{3}+x+\left[1+{\frac {1}{2}}(1-\kappa ^{2})x^{2}\right]{\sqrt {1+\kappa ^{2}x^{2}}}\right\}\exp _{\kappa }(-x)

Related distributions

The κ-Exponential distribution of type I is a particular case of the κ-Erlang distribution when $n=1$ ;
A κ-Erlang distribution corresponds to am ordinary exponential distribution when $\kappa =0$ and $n=1$ ;

References

^ ^a ^b ^c Kaniadakis, G. (2021-01-01). "New power-law tailed distributions emerging in κ-statistics (a)". Europhysics Letters. 133 (1): 10002. arXiv:2203.01743. Bibcode:2021EL....13310002K. doi:10.1209/0295-5075/133/10002. ISSN 0295-5075. S2CID 234144356.

External links

Kaniadakis Statistics on arXiv.org

[:0-1] Kaniadakis, G. (2021-01-01). "New power-law tailed distributions emerging in κ-statistics (a)". Europhysics Letters. 133 (1): 10002. arXiv:2203.01743. Bibcode:2021EL....13310002K. doi:10.1209/0295-5075/133/10002. ISSN 0295-5075. S2CID 234144356.

[1]

Fahrer / Team für die Suche eingeben: