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1
Demand for Repeated Insurance Contractswith Unknown Loss Probability
Emilio Venezian Venezian Associates
Chwen-Chi LiuFeng Chia University
Chu-Shiu LiFeng Chia University
2
Agenda
Introduction Purpose The basic assumptions Dynamics of self-selection for compulsory
coverage Dynamics of self-selection for voluntary
coverage Conclusion
3
Introduction-1
Under repeated contracting for automobile insurance, the insured might stay with the same insurer and the same policy or switch to other policy , switch to another insurer or even buy no insurance for the next year.
Thus, this paper tries to build a simple theoretical model to examine the buying behavior of multi-period contract.
4
Introduction-2
Mossin (1968) assumes that insurer’s estimate of the probability of lo
ss is the same as the insured.
Venezian (1980) the first to examine a model in which the probability is
not knowable, but this has never been used in a framework of choice of insurance coverage.
Eisenhaier(1993) assumes that insurers and the insured hold different
estimates of the probability of loss.
5
Introduction-3
Jeleva and Villeneuve (2004) assume that consumers whose beliefs and objective
probability differ.
Venezian (2005) argues that the relevant utility function is not the one t
hat applies at the time that the decision is made, it is the one that applies when uncertainty is resolved.
Li, et al.(2007) find out that decision makers tend to stick with prior in
surance policy or may it be evidence of rational behavior.
6
Introduction-4
Several papers explore multi-period insurance contracts such as
Palfrey et al.(1995), Cooper and Hayes(1987) Dionne and Doherty (1994), Nilssen (2000) Reynolds(2001)
However, none of these papers take into account the role of unknown loss probability
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Purpose
To explore the choice of deductibles by individuals and the effect on sequential decisions of assuming that the decision makers are uncertain about the accident frequency that will be observed in the policy year.
To examine how likely decision makers who chose high deductible and experience one accident are likely to switch to low deductible.
To analyze a theoretical model under the cases in which insurance is compulsory coverage and non-compulsory coverage.
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The General Model Assumptions-1
We assume that a population is actually homogeneous with respect to accident rate and has accidents that follow a Poisson distribution.
Individuals differ with respect to their priors on their own accident rates, each having a gamma distribution as the form of the prior, but with parameters that may differ from those of their peers.
9
The General Model Assumptions-2
Individuals are utility maximizers with constant absolute risk aversion that is known to the individuals, but the risk aversion may differ among individuals.
To enquire on the conditions under which Bayesian incorporation of information about accidents into the prior distribution of the accident rate of individuals might account for observations of switching behavior.
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Updating priors on the accident frequency
The gamma distribution of an accident rate at time 0 is given as :
The parameters can be related to the mean and variance of the random variable by :
kekf
1
)(
1)(
k
22
k
periodper rateaccident an
The General Model
11
If the individual experience n accidents, so the posterior, which is the prior at the beginning of the next period (at time 1) , is a gamma distribution with
Variance
1
k
n
22
)1(
k
n
The General Model
Expected value
12
n
o kk
k
n
ndfnpnp
1
1
1)(!
)( )( )()(
This is a negative binomial distribution
!)(
nenp
n
The General Model
If the individual has experienced n accidents, the accident probability will be
The priors of individuals follow a gamma distribution, thus the probability of n accidents during the next period is:
13
Thus the optimal deductible for the individual is :
)( WuEMax
)1(
)1)(1(1*
k
Lnr
D
)1()( DCDP
r
eWu
rW
1)(
nDDPWnW )()(
The General Model
14
Under Compulsory Coverage System
--- Selection of a Deductible
15
Dynamics of Self-Selection for Compulsory Coverage Given Two Deductibles
The choice of a low deductible , D1 , implies that
or, equivalently : ))(())(( 21 DWuEDWuE
)1()1( 2211 )1()1( rDDrrDDr ekeeke
(30)
11
)1)((
2
1
12
rD
rD
ekek
Ln
DDr
2
1
11
)1)(()( 12
rD
rD
ekek
Ln
DDrkz
)(kz where
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Dynamics of Self-Selection
After one period, n accidents have been experienced, then individuals will switch from Low deductible to High Deductible if
)(kz
)1(kzn
)(kz
)(kz
Dynamics of Self-Selection for Compulsory Coverage Given Two Deductibles
17
Under Voluntary Coverage System --- Selection of a Deductible
Or no insurance
18
rC
rD
ekek
Ln
DCr
11
)1)((2
2
The condition for selecting no insurance can be expressed as
In the next period, the individual with no insurance to switch to insurance with a deductible we have
rC
rDi
ekek
Ln
DCrn
i
22
)1)((
iD
C*Dwhere
Dynamics of Self-Selection for Voluntary Coverage Given Two Deductibles
19
Dynamics of Self-Selection
for Voluntary Coverage
0
11
)1)((
22
)1)((
22
)1)((2
rC
rDi
rC
rDi
rC
rDi
ekek
Ln
DCr
ekek
Ln
DCr
ekek
Ln
DCrn
ii
The condition for switching is, therefore
Thus at least one accident is necessary for a switch from no insurance to insurance with some deductible,but one accident might not be sufficient.
20
Conclusion-1
A simple model of uncertainty in accident frequency with Bayesian updating of the prior distribution can explain the main features of switching behavior in insurance purchases.
The model implies that a single accident is NOT sufficient to motivate a switch from high to low deductible and a single accident free period is NOT enough to motivate a switch from low to high deductible.
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Conclusion-2
Absolute certainty in the value of accident frequency implies that experience will not affect the change in the selection of a deductible.
Some uncertainty in the estimate will lead to Bayesian updating and the possibility of switches based on past history.
We suggest that the failure to switch from high to low deductible after one accident, or from low to high deductible after one accident free period may just be a maximization of expected utility under uncertainty.
22
Thank you