Panjer recursion

The Panjer recursion is an algorithm to compute the Probability distribution of a compound random variable ${\displaystyle S=\sum _{i=1}^{N}X_{i}}$. It was introduced in a paper of Harry Panjer ^[1]. It is heavily used in Actuarial science.

We are interested in the compound random variable ${\displaystyle S=\sum _{i=1}^{N}X_{i}}$ where ${\displaystyle N}$ and ${\displaystyle X_{i}}$ fulfill the following preconditions.

${\displaystyle N}$ is the "claim number distribution", i.e. ${\displaystyle N\in \mathbb {N} _{0}}$. ${\displaystyle N}$ is assumed to be independent of the ${\displaystyle X_{i}}$.

Furthermore, ${\displaystyle N}$ has to be a member of the Panjer class. The Panjer class consists of all counting random variables which fulfill the following relation: ${\displaystyle p_{k}=(a+{\frac {b}{k}})\cdot p_{k-1},~~k\geq 1.}$ for some ${\displaystyle a}$ and ${\displaystyle b}$ which fulfill ${\displaystyle a+b\geq 0}$. the value ${\displaystyle p_{0}}$ is determined such that ${\displaystyle \sum _{k=0}^{\infty }p_{k}=1.}$

Sundt proved in the paper ^[2] that only Binomial distribution, Poisson distribution and negative binomial distribution belong to the Panjer class. They have the parameters and values as described in the following table. ${\displaystyle W_{N}(x)}$ denotes the probability generating function.

Distribution	${\displaystyle P[N=k]}$	${\displaystyle a}$	${\displaystyle b}$	${\displaystyle p_{0}}$	${\displaystyle W_{N}(x)}$	${\displaystyle E[N]}$	${\displaystyle Var(N)}$
Binomial	${\displaystyle {\binom {n}{k}}p^{k}(1-p)^{n-k}}$	${\displaystyle {\frac {p}{p-1}}}$	${\displaystyle {\frac {p(n+1)}{1-p}}}$	${\displaystyle (1-p)^{n}}$	${\displaystyle (px+(1-p))^{n}}$	${\displaystyle np}$	${\displaystyle np(1-p)}$
Poisson	${\displaystyle e^{-\lambda }{\frac {\lambda ^{k}}{k!}}}$	${\displaystyle 0}$	${\displaystyle \lambda }$	${\displaystyle e^{-\lambda }}$	${\displaystyle e^{\lambda (s-1)}}$	${\displaystyle \lambda }$	${\displaystyle \lambda }$
negative binomial	${\displaystyle {\frac {\Gamma (r+k)}{k!\,\Gamma (r)}}\,p^{r}\,(1-p)^{k}}$	${\displaystyle 1-p}$	${\displaystyle (1-p)(r-1)}$	${\displaystyle p^{r}}$	${\displaystyle \left({\frac {p}{1-z(1-p)}}\right)^{r}}$	${\displaystyle {\frac {r(1-p)}{p}}}$	${\displaystyle {\frac {r(1-p)}{p^{2}}}}$

We assume the ${\displaystyle X_{i}}$ to be i.i.d. and independent of ${\displaystyle N}$. Furthermore the ${\displaystyle X_{i}}$ have to be distributed on a lattice ${\displaystyle h\mathbb {N} _{0}}$ with latticewidth ${\displaystyle h>0}$.

${\displaystyle f_{k}=P[X_{i}=hk]}$

The algorithm now gives a recursion to compute the ${\displaystyle g_{k}=P[S=hk]}$.

The starting value is ${\displaystyle g_{0}=W_{N}(f_{0})}$ with the special cases

${\displaystyle g_{0}=p_{0}\cdot \exp(f_{0}b)}$ if ${\displaystyle a=0\,}$, and

${\displaystyle g_{0}={\frac {p_{0}}{(1-f_{0}a)^{1+b/a}}}}$ for ${\displaystyle a\neq 0}$.

and proceed with

${\displaystyle g_{k}={\frac {1}{1-f_{0}a}}\sum _{j=1}^{k}(a+{\frac {b\cdot j}{k}})\cdot f_{j}\cdot g_{k-j}}$

The following example shows the approximated density of ${\displaystyle S=\sum _{i=1}^{N}X_{i}}$ where ${\displaystyle N\sim {\text{NegBin}}(3.5,0.3)}$ and ${\displaystyle X\sim {\text{Frechet}}(1.7,1)}$ with lattice width ${\displaystyle h=0.04}$