Practical GLM Modeling of Deductibles David Cummings State Farm Insurance Companies.
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Practical GLM Modeling of Deductibles David Cummings State Farm Insurance Companies
Transcript of Practical GLM Modeling of Deductibles David Cummings State Farm Insurance Companies.
Practical GLM Modelingof Deductibles
David Cummings
State Farm Insurance Companies
Overview
• Traditional Deductible Analyses
• GLM Approaches to Deductibles
• Tests on simulated data
Empirical Method
All losses at $500 deductible $1,000,000
Losses eliminated by
$1000 deductible $ 100,000
Loss Elimination Ratio 10%
Empirical Method
• Pros– Simple
• Cons– Need credible data at low deductible– No $1000 deductible data is used to
price the $1000 deductible
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Loss Distribution Method
• Fit a severity distribution to data
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Loss Distribution Method
• Fit a severity distribution to data• Calculate expected value of truncated
distribution
Loss Distribution Method
• Pros– Provides framework to relate data at
different deductibles– Direct calculation for any deductible
• Cons– Need to reflect other rating factors– Framework may be too rigid
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Complications
• Deductible truncation is not clean• “Pseudo-deductible” effect– Due to claims awareness/self-selection– May be difficult to detect in severity
distribution
GLM Modeling Approaches
1. Fit severity distribution using other rating variables
2. Use deductible as a variable in severity/frequency models
3. Use deductible as a variable in pure premium model
GLM Approach 1– Fit Distribution w/ variables
• Fit a severity model• Linear predictor relates to untruncated
mean• Maximum likelihood estimation adjusted
for truncation
• Reference:– Guiahi, “Fitting Loss Distributions with
Emphasis on Rating Variables”, CAS Winter Forum, 2001
GLM Approach 1– Fit Distribution w/ variables
X = untruncated random variable ~ Gamma
Y = loss data, net of deductible d
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);()(
)log( 110
XX
XXY
nnX
dF
dyfyf
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GLM Approach 1– Fit Distribution w/ variables
• Pros– Applies GLM within framework– Directly models truncation
• Cons– Non-standard GLM application– Difficult to adapt to rate plan– No frequency data used in model
Practical Issues
• No standard statistical software– Complicates analysis– Less computationally efficient
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);()(
)log( 110
XX
XXY
nnX
dF
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Not a member of Exponential Family of distributions
Practical Issues
• No clear translation into a rate plan– Deductible effect depends on mean– Mean depends on all other variables– Deductible effect varies by other variables
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);()(
)log( 110
XX
XXY
nnX
dF
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Practical Issues
• No use of frequency information– Frequency effects derived from
severity fit
– Loss of information
);(1 XX dyF
GLM Approach 2-- Frequency/Severity Model
• Standard GLM approach
• Fit separate frequency and severity models
• Use deductible as independent variable
• Pros– Utilizes standard GLM packages– Incorporates deductible effects on
frequency and severity– Allows model forms that fit rate plan
• Cons– Potential inconsistency of models– Specification of deductible effects
GLM Approach 2-- Frequency/Severity Model
Test Data
• Simulated Data– 1,000,000 policies – 80,000 claims
• Risk Characteristics– Amount of Insurance– Deductible– Construction– Alarm System
• Gamma Severity Distribution• Poisson Frequency Distribution
Conclusions from Test Data– Frequency/Severity Models
• Deductible as categorical variable– Good overall fit– Highly variable estimates for higher
or less common deductibles–When amount effect is incorrect,
interaction term improves model fit
Severity RelativitiesUsing Categorical Variable
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0.5
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1.5
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3.5
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Conclusions from Test Data– Frequency/Severity Models
• Deductible as continuous variable– Transformations with best likelihood• Ratio of deductible to coverage amount• Log of deductible
– Interaction terms with amount improve model fit
– Carefully examine the results for inconsistencies
Frequency Relativities
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1.2
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Deductible
100,000
500,000
CoverageAmount
Severity Relativities
0
0.2
0.4
0.6
0.8
1
1.2
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Deductible
100,000
500,000
CoverageAmount
Pure Premium Relativities
0
0.2
0.4
0.6
0.8
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1.2
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Deductible
100,000
500,000
CoverageAmount
GLM Approach 3 – Pure Premium Model
• Fit pure premium model using Tweedie distribution
• Use deductible as independent variable
GLM Approach 3 – Pure Premium Model
• Pros– Incorporates frequency and severity
effects simultaneously– Ensures consistency– Analogous to Empirical LER
• Cons– Specification of deductible effects
Conclusions from Test Data – Pure Premium Models
• Deductible as categorical variable– Good overall fit– Some highly variable estimates
• Good fit with some continuous transforms– Can avoid inconsistencies with good
choice of transform
Extension of GLM – Dispersion Modeling
• Double GLM • Iteratively fit two models–Mean model fit to data–Dispersion model fit to residuals
• ReferenceSmyth, Jørgensen, “Fitting Tweedie’s
Compound Poisson Model to Insurance Claims Data: Dispersion Modeling,” ASTIN Bulletin, 32:143-157
Double GLM in Modeling Deductibles
• Gamma distribution assumes that variance is proportional to µ2
• Deductible effect on severity–Mean increases– Variance increases more gradually
• Double GLM significantly improves model fit on Test Data–More significant than interactions
Pure Premium Relativities
0.8
0.9
1
1.1
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Deductible
Constant Dispersion Double GLM
Tweedie Model – $500,000 Coverage Amount
Conclusion
• Deductible modeling is difficult
• Tweedie model with Double GLM seems to be the best approach
• Categorical vs. Continuous – Need to compare various models
• Interaction terms may be important
