CENTRAL CREDIBILITY
The Central
Credibility is a theory I have had developed using
the basic idea of my ”Central Point Theory”. The Central
Credibility is a linear estimate that produced exact credibility
estimate without random errors. The Central Credibility is used to
estimate risks that are independent and identically distributed or not identically distributed for any time t without error.
In Central
Credibility, it is the size of the error that matter, so that a 0.00
error in 0.10 rate gets the same weight as 0.00 error in 100.00
rate. The formula for Central Credibility is given as;
µ*(ѳi) = αixim+
βixm
Where;
µ(ѳi)=Credibility estimate per risk
xim=mean claim per risk
xm=total mean claims of all risks
αi=variable coefficient per risk
βi=variable coefficient per risk
The variable
coefficient αi and βi is defined as;
α=[zixim+(1-zi)xm]/2xim
β=[zixim+(1-zi)xm]/2xm
where zi is a credibility assigned
to the estimator xm and
is defined as;
z=[Variance of The Hypothetical Means/Total Variance of
The Estimator xm]
In
symbolically form ,we have
Z = n/(n+k)→Homogeneous in time is assumed.
Z=m/(m+k)→Heterogeneous in time is real.
n =number of observations
m=total exposure.
k=[Expected Process Variance/ Variance of The
Hypothetical mean].
The error of
the estimate using the weight µ* as the complement of credibility is
given as;
e=xm-µ*
Where;
µ*=Σmixim/2Σβimi
EXAMPLE
SIC offers a
janitorial services policy that is rated on per employee basis. The two
measured shown in the table below were randomly selected from SIC Policyholder
database. Over a four-year period the following was observed.
INSURED
|
Y
|
Y+1
|
Y+2
|
Y+3
|
|
A
|
No. of claims
|
3
|
2
|
3
|
1
|
No. of employees
|
2
|
2
|
2
|
1
|
|
B
|
No. of claims
|
0
|
1
|
1
|
|
No. of employees
|
4
|
4
|
4
|
1) Estimate the exact annual claim
frequency per employee in each insured using the Central Credibility theory.
2) Is the model (or theory) actually
perfect?
OLUTION
mA=7 and mB=12
XAm = 9/7
XAm = 1/6
Xm=11/19
σA=0.1429
σA =0.0833
EPV*=0.1191
VHM*=0.617
K=0.1944
Z*A=0.9730
Z*B=0.9841
INSURED A
αA=0.4926
βA =1.0939
INSURED B
αB=0.5196
βB =0.1496
ence, the expected annual claim frequency for Insured A and B are;
µ(ѳ)A=0.4926(9/7) +
0.5182(11/19)=0.9333
µ(ѳ)B=0.5196(1/6) +
0.1496(11/19)=0.1732
2) e=xm=µ*
µ*=[(7(9/7) + 12(1/6))/2(1.0939(7) +0.1496(12))]
µ*=[10.9999992/18.905]=0.58
e=0.58-0.58=0
Yes: zero error indicates perfect model.
REFERENCE
*Adongo Ayine William(Me). Transcript(2008), Posted(EMS-Bolgatanga Branch) to Mathematical Association of Ghana in the Year 2008.
*Buhlmann, Hans, "Experience Rating and Credibility" ASTIN Bullitin, Vol.4, No.3, 1967, PP.199-207.
