Chapter 18: Modelling Flashcards
What is a model?
A model can be defined as a ‘cut-down, simplified version of reality that captures the essential features of the problem and aids understanding and in producing potential solutions to the problem
It is important to be able to communicate the results effectively
Modelling requires a balance to be struck between which two things?
- Reality, and hence complexity
- Simplicity, for easy of use, verification and interpretation of results
What is the advantage of an actuarial model over a formula?
A model is better able to reflect uncertain future events by giving an indication of the effects of varying the assumptions.
This is important so that the client understands the uncertainty involved in the underlying assumptions
Where might a model come from and what factors affect the decision about where to get it
Internal - New model developed from scratch - Modify an existing model
External - Commercially available models
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The decision depends on:
- Availability of a model
- Do you have in-house expertise
- Do you have time
- How often you are going to use the model
- Costs
- Level of flexibility required
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Outline the operational issues that need to be considered when designing and constructing a model
SCARCER DVR’S
Simple, but retains key features Clear results (Output reasonable) Adequately documented Range of implementation methods (to facilitate testing and parameterisation, and based on the focus of the results) Communicable workings and output Easy to understand Refineable and developable over time Dynamic: Assumptions used to model assets and liabilities must be consistent Valid for purpose Rigorous Sensible joint behavior of variables (eg higher expense inflation means higher claims inflation, etc).
Define what is meant by ‘dynamism’ of a model
If a model is dynamic, then the assumptions used to model assets and liabilities are consistent with each other and are programmed to interact under different scenarios as they do in reality.
For example:
- Inflation rates and investment returns
- Bonus rates and investment returns
- Withdrawal rates and economic conditions
Developing a deterministic/stochastic model
Specify the problem
- Pricing vs Reserving
- Are we interested in snapshot reserves or cashflows over time
- Internal or external use
Collect and modify data where necessary
Choose:
- Model (whether to use a stochastic or deterministic model or a hybrid, and which one of the available models)
- Variables (claims, expenses and premiums)
- Parameters (economic, demographic, …)
- Stochastic: prob density function and correlation matric)
Construct the model and check for errors
Check “goodness of fit”
- Output reasonable
- Can you replicate last year’s results
- Scenario/sensitivity tests
- Spot checks
If okay, calculate and interpret the results
Outline the two factors to consider in choosing the time period (or frequency) for the projection of the cashflows in a model
- The more frequently the cashflows are calculated the more reliable the output from the model, although there is a danger of spurious accuracy (false accuracy)
- The less frequently the cashflows are calculated the faster the model can be run, and results obtained
What are the RELATIVE merits of deterministic vs stochastic models?
Deterministic:
- Quicker, cheaper and easier to design, build and run
- Clearer what scenarios have been tested
- Results are easier to explain to a non-technical audience
Stochastic:
- Allows naturally for the uncertainty of outcomes
- Enable better modelling of the correlations between variables
- Test a wider range of scenarios
- Good at identifying extreme outcomes, which may not have been thought of under a deterministic scenario
- Important in assessing the impact of financial guarantees
Outline how a deterministic model could be used to determine a set of new premium rates for a term assurance contract
- An objective would be set based on profit criterion and an appropriate time horizon
- Data relating to the existing profile of customers would be collected and model points created. It would be modified for any perceived future differences in the profile of customers
- Parameter values for key assumptions such as mortality, expenses, lapses and investment returns would be set based on past experience
- For each model point, the model would be run, projecting future cashflows and discounting the net profits at the risk discount rate (RDR). The premium would be varied until the required profit criterion is met.
List four methods of assessing statistical risk
- In some situations, analytically – by considering the variances of the individual parameter values used
- By using sensitivity analysis, with deterministically assessing variations in parameter values
- By using stochastic models for some, or all, if the parameter values and simulation
- By comparison with any available market data
What should the rate used to discount the net cashflows in model reflect
- The return required by the company
- The level of statistical risk attaching to the cashflows
NOTE: In theory a different discount rate should be used for each cashflow (as the risk is different); In practice a single rate is often used based on the average risk of the product
What are model points? Why are they used? How may they be chosen?
A model point is a representative single policy
The business being modelled may comprise a very large number of different policies and it may be too time consuming to run all of these through a model.
So, policies are classified into relatively homogeneous groups.
A model point for each group is chosen that is representative of the whole group.
The model point is run through the model and the output is then scaled up by the number of policies in the group to give the results of the whole group.
For pricing purposes, model points are chosen to reflect the expected profile of future business to be sold. This could be based on the existing profile, or that of a similar product.
When are model points not used?
Model points are not generally used when VALUING LIABILITIES for calculating reserves.
The normal procedure for determining the value of life assurance or pension scheme liabilities is to value the benefits for each actual policy or scheme member individually.
In many territories this may be a regulatory requirement
However, model points may be required in order to answer various ‘what if’ questions
How can models be used in risk management?
Models can be used to determine:
- The extent of a risk event that will occur with a given probability
- The amount of capital that is needed to support such an event
