Chapter 18: Reserving uncertainty Flashcards
Best estimate reserve definition and Characteristics of a best estimate reserve
“Best estimate is a point estimate and does not convey a range of estimates.
It is prepared by actuaries using statistical or other established actuarial techniques or practices
When arriving at a best estimate, we do not deliberately add any margins or prudence or adjust to get a optimistic value.
Actuaries endeavor to prepare it without any bias or favor for a particular method/approach.
However, it includes any current information that is relevant for the claims.
“
Four approaches to quantify uncertainty as per TAS R
“The four approaches are:
• giving a range, measure of the value at risk or other statistical calculation
• showing the numerical consequences of changes in assumptions
• presenting the outcomes of scenarios, possibly including extreme scenarios
• describing the uncertainty and explaining why it has not been quantified.”
Points to consider when reporting uncertainty
“The key points to consider when communicating the uncertainty in reserve estimates are:
• A numerical estimate of uncertainty should be included in any formal report that gives a point estimate of reserves.
• Relevant professional guidance should be adhered to …
• … eg TAS R states that an actuarial report “shall indicate the nature and extent of any material uncertainty in the information it contains.”
• Consider whether it is practical to quantify the uncertainty …
• … often expressed in percentiles …
• … or whether on it is sufficient to include a descriptive summary.
• Note that a percentile approach is a percentile within a model and is therefore prone to residual model error.
• Consider the need to demonstrate the uncertainty in outcome rather than a range for the best estimate.
• Consider need to communicate uncertainty in a way that the intended audience will understand …
• … consider their level of technical knowledge.
• It is likely that stakeholders will prefer being told the range of possible outcomes.”
A2021 - Q3:
(i) Suggest possible reasons why a general insurance company may wish to
include a loading on top of its best estimate reserves.
(i)
To allow for potential adverse experience that the Company may suffer [½]
Such that reserves are not exhausted when experience is worse than expected [½]
May be a regulatory requirement [½]
Maintain/improve credit rating [½]
Stay in line with competition [½]
Most candidates seemed to understand the Use test well, although a few candidates did appear to think of calculating the capital itself being the main component of the Use Test.
Perhaps because the company has always done so, and to keep it consistent with the past practice [½]
Provide higher level of confidence to the various stakeholders in the company’s ability to meet claims to various stakeholders [½]
To allow for sufficient prudence in the reserves as per the accounting principle of prudence [½]
Best estimates might only be the central estimate of the loss distribution, and may not be fully representative of the actual performance which can be more adverse [½]
Historical experience of late reporting of losses/ large losses causing the Best Estimate to being insufficient [½]
Management decision based on their understanding of the business [½]
Smoothing of results year-on-year [½]
Deferring profits or tax management [½]
Changes to the claims handling policies rendering case reserves being booked at the lower end of the spectrum
A2021 - Q3:
A large personal lines insurer mainly writes Household insurance business.
Historically, the insurer has booked the Chief Actuary’s best estimate reserves.
However, the insurer is now considering adding an additional margin for uncertainty
on top of the best estimate reserves.
(ii) Describe three possible approaches that the company may take to calculate
such a margin for uncertainty. [6]
(iii) Discuss the advantages and disadvantages of each of the approaches in
part (ii).
(ii)
Percentile-based approach/Stochastic approach
Set Margin for Uncertainty (MfU) to bring reserves up to a certain percentile, e.g. up to 75th percentile [1]
Involves coming up with a distribution of the reserves [½]
Stochastic approach to setting the MfU. [½]
Mack/ODP [½]
Scenario-based approach
Process of setting the MfU based on certain specified real-life scenarios around companies’ reserve estimates [1]
Typically involves considering possible events that could have an adverse impact on companies’ reserves [½]
Can derive a scenario in a variety of ways: basing it on an historical event, thinking up a hypothetical event using our judgement, or from the results of a stochastic model [½]
Based on the concept that in extreme conditions, areas of uncertainty may become more correlated [½]
For example, risk of fires and subsidence claims during and following a spell of dry weather [½]
Any other suitable examples, including the ones in the Core reading [½]
Percentage loading on top of best estimate
Simply involves applying a straight percentage loading on top of companies’ best estimate reserve picks [1]
Percentage arrived at using judgement [½]
Or could be prescribed by the regulator [½]
Cost of Capital approach
Involves calculating an explicit MfU as a risk margin calculated using a cost of capital approach, where future projected capital requirements are multiplied by a chosen cost of capital % [1]
The cost of capital may be prescribed by the regulator, or industry practice [½]
SP7 - General Insurance - Specialist Principles - April 2021 - Examiners’ report
SP7 A2021 © Institute and Faculty of Actuaries
and then discounted back to the present day [½]
Ad-hoc loading approach
Involves adding an explicit ad-hoc loading amount on top of the best estimate reserves, [1]
For example, $Xm on top of best estimate [½]
Typically arrived at using judgment [½]
Could represent a loading for estimates for a 1-in-200 flood event [½]
Alternative set of assumptions
Involves choosing an alternative, more prudent set of assumptions compared to the actuary’s best estimate view, [1]
Typically arrived at using judgment. [½]
For example, choosing a slower LDF, higher IELR, more prudent frequency and severity. [½]
If the candidate has provided more than three approaches, mark the best three only since the
(iii)
(iii)
Percentile-based approach
Advantages:
Sophisticated approach that is consistent year-on-year [½]
Specified valuation approach, assists with conversations with Auditors, regulators, etc. [½]
Disadvantages:
Time consuming/Expensive [½]
Complex/difficult to explain [½]
May lead to spurious accuracy, and/or give a false sense of security [½]
Choice of model might not be correct [½]
Impractical if limited past data is available [½]
Scenario-based approach
Advantages:
Takes into account specifics of companies’ exposures to certain scenarios [½]
Because it is aimed at the specific question, we can construct a scenario test and produce reliable results much more quickly than for a stochastic model [½]
Encourages engagement with stakeholders from other areas of the business (e.g. Underwriting, Claims, etc.) as scenarios are easy to communicate and understand [½]
Model uncertainty is much less of a problem when we construct scenario tests because we consider the driving factors explicitly [½]
Disadvantages:
Time consuming to arrive at scenarios and select appropriate probability, many different stakeholders may want to get involved in the process [½]
Significant amount of judgement likely to be involved, both in arriving at possible scenario losses, and in the selection of the likelihood of the scenarios [½]
Typically only give information on the extremes of the distribution of eventual outcomes [½]
Percentage loading on top of best estimate
Advantages:
Simple approach that is easy and inexpensive to update each valuation [½]
May allow greater Board/stakeholder engagement with MfU due to the simplicity of the technique [½]
Disadvantages:
Might be the only option if prescribed by the regulator [½]
May be overly simplistic and hence not allow for specifics of the reserve risks companies are actually exposed to [½]
Arbitrary approach may cause issues in discussions with stakeholders [½]
Difficult to choose a percentage if not prescribed [½]
Cost of Capital approach
Advantages:
Sophisticated approach that is consistent year-on-year [½]
May be reasonably accurate proxy in terms of what the MfU in intended to allow for [½]
Disadvantages:
• Complex/Time consuming [½]
• Expensive/Difficult to explain. [½]
• May lead to spurious accuracy, and/or give a false sense of security. [½]
Alternative Set of Assumptions
Advantages:
Simple to understand [½]
Doesn’t require any additional modelling as the same model can be re-run using a different set of assumptions
Disadvantages:
Choosing the alternative set of assumptions can be tricky [½]
Might not be able to communicate what the statistical level of confidence is for the new outcome, as it doesn’t produce a full distribution [½]
The alternative set of assumptions may require some underlying statistical analysis to arrive at leading to extra effort, and a statistical approach might be better [½]
Ad-hoc loading approach
Advantages:
Simple approach not requiring extensive process [½]
May be reasonably accurate proxy in terms of what the MfU in intended to allow for in that it makes use of expert judgement to feed into estimate [½]
Disadvantages:
Not a structured calculation process, hence incremental process to update each year [½]
May attract attention from Auditors/Regulators as to why there isn’t a structured calculation process around the loading year-on-year [½]
From your memory of earlier in the course, write down as many factors as you can that contribute to reserve uncertainty.
Sources of process error
– – –
general claims uncertainty –
inherent uncertainty in individual claims (amount, frequency and timing) changes in mix of business demand surge
normal retirement
internal sources, such as: –
– – – – changes in business mix booked reserves different to best estimate
uncertainty over commission and other sales-related expenses new markets
new types of investment
systematic sources, such as
the economic environment the insurance cycle
The
Sources of parameter error
the data used –
– –
poor quality data inconsistent data
incomplete and non-existent data
incorrect modelling assumptions, eg: –
–
correlations in the model statistical distributions
change in case estimate reserving philosophy planned or unplanned changes in mix
particularly large / unusual risks: –
– –
large claims catastrophes
latent claims
inadequate data supplied by third party claims handlers format of data
claims inflation not as expected uncertain sales-related expenses, commission, new distribution channels, etc.
Sources of model specification error
model error programming error simulation error / too few simulations
Model uncertainty in reserving
Model uncertainty is the risk that an inappropriate model has been used in the estimation process.
This arises because actuarial models are often a simplification of a very complex (and unknown) underlying system. By using a simplified model to project the true underlying system, we are introducing an unknown bias into the model.
This introduces uncertainty in the estimates produced by the model.
A common example of this in actuarial modelling is the use of parametric distributions for outstanding claims reserves (like the log-normal distribution). The complexity of the claims process and the factors influencing it make it unlikely that the real distributions match simple statistical models.
We can reduce model uncertainty by using actuarial judgement when we select a model. This means that we select models which best capture the key features of the process. This is especially important when the volumes of past data are insufficient to test whether a model is inappropriate.
For example, by splitting data into perceived homogenous groups, we can reduce model error, but this could also affect the estimates of parameter uncertainty (including correlation parameters) and process uncertainty.
This is because the homogeneous groups may not contain sufficient credible data, therefore increasing uncertainty.
Parameter uncertainty in reserving
Parameter uncertainty refers to the uncertainty in determining the parameters for an actuarial model. This usually results from the statistical variability present in the historical data used to estimate the parameters. Past data will never comprise all possible outcomes.
An absence of large losses in historical data can lead to an error in the estimation of the ‘average’ claim development pattern.
For example, mortgage indemnity guarantee business can have long periods of stable (and low) claims experience during periods when the economy is performing well. However there is always the risk of an economic downturn and a significant increase in claims.
If we assign our parameter values by analysing past claims experience only, this will lead to inappropriate reserve estimates.
We can sometimes reduce parameter uncertainty by using judgement when we select parameters. Quantifying the impact of using judgement on parameter uncertainty is itself (usually) a matter of judgement. There will always be some parameter uncertainty.
In combination, parameter and model uncertainty lead to the statistical risk that the outcome of the exercise will not form a good reflection of the underlying claim distribution. This is a result of insufficient / inaccurate data and an inappropriate fit of the model.
Process uncertainty in reserving
If a process is assumed to be inherently stochastic, the future outcome will be uncertain because of the randomness of the process and the fact of course that many of these events have yet to occur.
This uncertainty is present even if model selection is perfect and the parameters are known with certainty.
An example of this is the uncertainty present in an unearned premium reserve for business exposed to Gulf of Mexico hurricanes. In this case, the eventual liability could be very different from a correct average liability if a hurricane materialises during the unexpired risk period.
This is because there is uncertainty in the timing of the hurricane, related to seasonality, so estimating UPR at a point in time is tricky.
These sources will contribute to the overall uncertainty of a point estimate. The most significant source of uncertainty will depend on the situation.
For example, a key source of process uncertainty for product liability business will be the emergence or otherwise of a new type of claim, whereas for a commercial fire portfolio it might be the occurrence of a major catastrophe.
The process uncertainty in a large portfolio of (reasonably) independent personal motor risks can be quite small compared to model and parameter risk. The opposite might be true for a small book of excess liability risks.
The
estimation or prediction error.
We sometimes refer to the combination of process and parameter uncertainty as estimation or prediction error.
The process uncertainty in a large portfolio of (reasonably) independent personal motor risks can be quite small compared to model and parameter risk. The opposite might be true for a small book of excess liability risks.
Justify why?
For a small book of business we would expect there to be greater uncertainty surrounding the future outcome.
Also liability business may be more likely to include large heterogeneous risks and have the chance of latent claims emerging. Again this leads to greater uncertainty regarding the future claims outgo, ie increased process uncertainty.
Excess business is likely to be more volatile since it captures only the upper portions of the insured losses and of course the tail-end of any distribution is subject to a high degree of uncertainty.
Further volatility in claim amounts is introduced if different levels of excess apply to each inwards risk.
What is a best estimate?
We normally define the best estimate as the actuary’s view of the mean or expected value (also called the unbiased probability – the weighted average) of the eventual outcome.
It is very important to recognise that in many, if not most, situations it will not be possible for the actuary to derive the mean of the outcomes with a high degree of certainty.
Instead, the actuary will estimate a reserve value using an approach that is intended to derive a mean or expected outcome. The actuary will not be certain that the value derived does equate to a mean value but will ascribe the term ‘best estimate’ to the determined value to convey the ‘type’ of estimate that the actuary is deriving.
The term ‘best estimate’ is used in this case to distinguish it from a prudent or optimistic estimate.
In such circumstances, we can consider the best estimate as the actuary’s subjective derivation of the probability-weighted mean of all possible outcomes, taking into account all available information about the business being analysed.
It should also be noted that the actuary will be calculating a sample mean as an approximation to the population mean. This means that a best estimate should allow for information that is available to the actuary but may not be reflected in the underlying data yet.
For example, an actuary may be aware that a portfolio is exposed to catastrophic events, even though no catastrophes have occurred within the period of the past data. Therefore, the actuary will need to make an allowance for this in his/her calculation of the best estimate.
The term ‘best estimate’ reserve is also used in other areas and is not necessarily defined in a statistical framework. For example, under the Solvency II regime, the reserving actuary is required to identify ‘best estimate’ reserves, which are the mean of all possible outcomes, not just those present in the data.
It should be noted that if certain outcomes have been excluded when making the estimate (for example the failure of reinsurance, the emergence of extreme outcomes or latent claims), the estimate will be different than if they had been included. The actuary should make clear what has and what has not been included in deriving the best estimate.
For a point estimate, alternatives to a best estimate are:
the median the mode
an estimate with a particular likelihood of exceeding the outcome.
What are the key characteristics of Best Estimate reserves?
The key characteristics of a ‘best estimate’ in this context are that:
It is a point estimate. The best estimate is described as a single number, not as a range of reasonable outcomes.
It is not inherently optimistic or pessimistic. The best estimate does not include any deliberate bias in the setting of the underlying assumptions. It is meant to be the actuary’s impartial view of the reserves with no margins, implicit or explicit, for prudence or optimism.
It is based on sound and appropriate actuarial or statistical techniques. It is based on current and credible information.
The requirements say nothing about the skewness of the underlying distribution or its inherent volatility.
3 pillars of solvency II
Solvency II is the regulatory regime applicable to UK general insurance companies in the EU. It requires firms to value their assets and liabilities on a market-consistent basis and more risk-sensitive capital requirements address asset as well as liability risks. It consists of three ‘pillars’.
Pillar 1 sets out the reserving basis and the capital requirements companies are required to meet for insurance, credit, market and operational risk. Capital requirements may be calculated using a standard formula or, if firms have supervisory approval, they may use their own capital models.
Pillar 2 consists of a supervisory review process to evaluate the adequacy of capital and the company’s risk management systems and processes. Supervisors may decide that a company should hold additional capital against any risks not adequately covered in Pillar 1.
The aim of Pillar 3 (disclosures) is to harness market discipline by requiring firms to publish certain details of their risks, capital and risk management.
Give examples of insurance risk, credit risk, market risk and operational risk for a household property insurer.
Insurance risk – poor weather, leading to many claims from flooding and burst pipes.
Credit risk – this is the risk of third party default, eg failure of a reinsurer / broker, failure of assets. Market risk – volatility of assets and liability values.
Operational risk – this is the failure of people, processes and systems, eg poor claims handling procedures.
Margin in reserves on top of the best estimate:
Risk margin and range
Depending on the purpose, most reserving exercises involve deriving a ‘best estimate’ of the reserves or an alternative estimate that may contain a margin. In other words, the strength of the basis will depend on the purpose of the exercise.
We can see that the best estimate is not a single defined amount that can be derived from a given dataset.
For example, if we gave 100 actuaries the same data and asked them to derive their best estimate of the reserves, the results would not all be the same – in fact there would be a ‘range of best estimates’.
We can define such a range as one which reflects the parameter uncertainty and model error alone; in other words it expresses the uncertainty arising from the selection of parameters and/or a given model, given the data available.
If we asked one of these 100 actuaries to provide an indication of the uncertainty that exists around their selected best estimate (derived using a chosen model or process), this would reflect some or all of the process uncertainty alone.
Examples of reserve ranges used by actuaries
- Range of best estimates
- ‘Range of possible outcomes’: this would represent the actuary’s estimate of the complete range of outcomes for future claims. It would therefore be significantly wider than the range of best estimates and rarely of much practical use for live portfolios.
This is because it includes extreme events which might not even be considered as plausible, for example a ‘one-in-1000-year-event’.
It can be of value as a run-off portfolio nears closure as it becomes important to understand residual uncertainty. - ‘Range of reasonable / probable / plausible outcomes’: this would typically be wider than a range of best estimates, but much narrower than the range of possible outcomes.
It would be wider than a range of best estimates because it would allow for outcomes that cannot be reasonably regarded as an estimate of the mean or average outcome, but which can still be regarded as plausible outcomes.
We can think of this range as allowing for parameter / model uncertainty and some element of process uncertainty as well. It would effectively include the outcomes that the actuary regards as plausible or probable but exclude those outcomes that the actuary regards as extreme (being either very low or very high). It would exclude the very extremes that would be included in a range of possible outcomes (in general this would not include the possibility that no further claims are paid).
Why are such reserve ranges useful?
A range of best estimates or a range of reasonable outcomes may be useful when management are considering what reserve estimates should be booked in their accounts. A range of possible outcomes may be useful when considering the resilience of the company to adverse events and/or when purchasing reinsurance.
Estimating the range of possible outcomes
There are methods that allow us to quantify some of the uncertainty in the outstanding reserves. However, we should use judgement when we interpret the results of such methods, just as we do for methods which only produce point estimates.
There are no universally-agreed standards for quantifying uncertainty in the reserves. It will be important for the actuary to select the most appropriate approach given the circumstances. This will require the actuary to weigh up the costs versus benefits of the different approaches.
There are three commonly used approaches for quantifying uncertainty:
stochastic models
alternative sets of assumptions scenario testing.
