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Estimating the Predictive Distribution for Loss Reserve Models

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Estimating the Predictive Distribution for Loss Reserve Models

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    1. Estimating the Predictive Distribution for Loss Reserve Models Glenn Meyers ISO Innovative Analytics CAS Annual Meeting November 14, 2007

    2. S&P Report, November 2003 Insurance Actuaries – A Crisis in Credibility “Actuaries are signing off on reserves that turn out to be wildly inaccurate.”

    3. Background to Methodology - 1 Zehnwirth/Mack Loss reserve estimates via regression y = a·x + e GLM – E[Y] = f(a·x) Allows choice of f and the distribution of Y Choices restricted to speed calculations Clark – Direct maximum likelihood Assumes Y has an Overdispersed Poisson distribution

    4. Background to Methodology - 2 Heckman/Meyers Used Fourier transforms to calculate aggregate loss distributions in terms of frequency and severity distributions. Hayne Applied Heckman/Meyers to calculate distributions of ultimate outcomes, given estimate of mean losses

    5. High Level View of Paper Combine 1-2 above Use aggregate loss distributions defined in terms of Fourier transforms to (1) estimate losses and (2) get distributions of ultimate outcomes. Uses “other information” from data of ISO and from other insurers. Implemented with Bayes theorem

    6. Objectives of Paper Develop a methodology for predicting the distribution of outcomes for a loss reserve model. The methodology will draw on the combined experience of other “similar” insurers. Use Bayes’ Theorem to identify “similar” insurers. Illustrate the methodology on Schedule P data Test the predictions of the methodology on several insurers with data from later Schedule P reports. Compare results with reported reserves.

    7. A Quick Description of the Methodology Expected loss is predicted by chain ladder/Cape Cod type formula The distribution of the actual loss around the expected loss is given by a collective risk (i.e. frequency/severity) model.

    8. A Quick Description of the Methodology The first step in the methodology is to get the maximum likelihood estimates of the model parameters for several large insurers. For an insurer’s data Find the likelihood (probability of the data) given the parameters of each model in the first step. Use Bayes’ Theorem to find the posterior probability of each model in the first step given the insurer’s data.

    9. A Quick Description of the Methodology The predictive loss model is a mixture of each of the models from the first step, weighted by its posterior probability. From the predictive loss model, one can calculate ranges or statistics of interest such as the standard deviation or various percentiles of the predicted outcomes.

    10. The Data Commercial Auto Paid Losses from 1995 Schedule P (from AM Best) Long enough tail to be interesting, yet we expect minimal development after 10 years. Selected 250 Insurance Groups Exposure in all 10 years Believable payment patterns Set negative incremental losses equal to zero.

    12. Look at Incremental Development Factors Accident year 1986 Proportion of loss paid in the “Lag” development year Divided the 250 Insurers into four industry segments, each accounting for about 1/4 of the total premium. Plot the payment paths

    13. Incremental Development Factors - 1986

    14. Do Incremental Development Factors Differ by Size of Insurer? Form loss triangles as the sum of the loss triangles for all insurers in each of the four industry segments defined above. Plot the payment paths

    16. Expected Loss Model Paid Loss is the incremental paid loss in the AY and Lag ELR is the Expected Loss Ratio ELR and DevLag are unknown parameters Can be estimated by maximum likelihood Can be assigned posterior probabilities for Bayesian analysis Similar to “Cape Cod” method in that the expected loss ratio is estimated rather than determined externally.

    17. Distribution of Actual Loss around the Expected Loss Compound Negative Binomial Distribution (CNB) Conditional on Expected Loss – CNB(x | E[Paid Loss]) Claim count is negative binomial Claim severity distribution determined externally The claim severity distributions were derived from data reported to ISO. Policy Limit = $1,000,000 Vary by settlement lag. Later lags are more severe. Claim Count has a negative binomial distribution with l = E[Paid Loss]/E[Claim Severity] and c = .01 See Meyers - 2007 “The Common Shock Model for Correlated Insurance Losses” for background on this model.

    18. Claim Severity Distributions

    20. Likelihood Function for a Given Insurer’s Losses –

    21. Maximum Likelihood Estimates Estimate ELR and DevLag simultaneously by maximum likelihood Constraints on DevLag Dev1 = Dev2 Devi = Devi+1 for i = 2,3,…,7 Dev8 = Dev9 = Dev10 Use R’s optim function to maximize likelihood Read appendix of paper before you try this

    22. Maximum Likelihood Estimates of Incremental Development Factors

    23. Incremental Development Factors - 1986 (Repeat of Earlier Slide)

    24. Maximum Likelihood Estimates of Expected Loss Ratios

    25. Testing the Compound Negative Binomial (CNB) Assumption Calculate the percentiles of each observation given E[Paid Loss]. 55 observations for each insurer If CNB is right, the calculated percentiles should be uniformly distributed. Test with PP Plot Sort calculated percentiles in increasing order Vector (1:n)/(n+1) where n is the number of percentiles The plot of the above two vectors against each other should be on the diagonal line.

    26. Interpreting PP Plots

    27. Testing the CNB Assumptions Insurer Ranks 1-40 (Large Insurers)

    28. Testing the CNB Assumptions Insurer Ranks 1-40 (Large Insurers)

    29. Testing the CNB Assumptions Insurer Ranks 41-250 (Smaller Insurers)

    30. Using Bayes’ Theorem Let W = {ELR, DevLag, Lag = 1,2,…,10} be a set of models for the data. A model may consist of different “models” or of different parameters for the same “model.” For each model in W, calculate the likelihood of the data being analyzed.

    31. Using Bayes’ Theorem Then using Bayes’ Theorem, calculate the posterior probability of each parameter set given the data.

    32. Selecting Prior Probabilities For Lag, select the payment paths from the maximum likelihood estimates of the 40 largest insurers, each with equal probability. For ELR, first look at the distribution of maximum likelihood estimates of the ELR from the 40 largest insurers and visually “smooth out” the distribution. See the slide on ELR prior below. Note that Lag and ELR are assumed to be independent.

    33. Prior Distribution of Loss Payment Paths

    34. Prior Distribution of Expected Loss Ratios

    35. Predicting Future Loss Payments Using Bayes’ Theorem For each model, estimate the statistic of choice, S, for future loss payments. Examples of S Expected value of future loss payments Second moment of future loss payments The probability density of a future loss payment of x, The cumulative probability, or percentile, of a future loss payment of x. These examples can apply to single (AY,Lag) cells, of any combination of cells such as a given Lag or accident year.

    36. Predicting Future Loss Payments Using Bayes’ Theorem for Sums over Sets of {AY,Lag} If we assume losses are independent by AY and Lag

    37. Predicting Future Loss Payments Using Bayes’ Theorem Calculate the Statistic S for each model. Then the posterior estimate of S is the model estimate of S weighted by the posterior probability of each model

    38. Sample Calculations for Selected Insurers Coefficient of Variation of predictive distribution of unpaid losses. Plot the probability density of the predictive distribution of unpaid losses.

    39. Predictive Distribution Insurer Rank 7

    40. Predictive Distribution Insurer Rank 97

    41. CV of Unpaid Losses

    42. Validating the Model on Fresh Data Examined data from 2001 Annual Statements Both 1995 and 2001 statements contained losses paid for accident years 1992-1995. Often statements did not agree in overlapping years because of changes in corporate structure. We got agreement in earned premium for 109 of the 250 insurers. Calculated the predicted percentiles for the amount paid 1997-2001 Evaluate predictions with pp plots.

    43. PP Plots on Validation Data

    44. Feedback If you have paid data, you must also have the posted reserves. How do your predictions match up with reported reserves? In other words, is S&P right? Your results are conditional on the data reported in Schedule P. Shouldn’t an actuary with access to detailed company data (e.g. case reserves) be able to get more accurate estimates?

    45. Response – Expand the Original Scope of the Paper Could persuade more people to look at the technical details. Warning – Do not over-generalize the results beyond commercial auto in 1995-2001 timeframe.

    46. Predictive and Reported Reserves For the validation sample, the predictive mean (in aggregate) is closer to the 2001 retrospective reserve. Possible conservatism in reserves. OK? “%” means % reported over the predictive mean. Retrospective = reported less paid prior to end of 1995.

    47. Predictive Percentiles of Reported Reserves Conservatism is not evenly spread out. Conservatism appears to be independent of insurer size Except for the evidence of conservatism, the reserves are spread out in a way similar to losses. Were the reserves equal to ultimate losses?

    48. Reported Reserves More Accurate? Divide the validation sample in to two groups and look at subsequent development. 1. Reported Reserve < Predictive Mean 2. Reported Reserve > Predictive Mean Expected result if Reported Reserve is accurate. Reported Reserve = Retrospective Reserve for each group Expected result if Predictive Mean is accurate? Predictive Mean ? Retrospective Reserve for each group There are still some outstanding losses in the retrospective reserve.

    49. Subsequent Reserve Changes Group 1 50-50 up/down Ups are bigger Group 2 More downs than ups Results are independent of insurer size

    50. Subsequent Reserve Changes

    51. Main Points of Paper How do we evaluate stochastic loss reserve formula? Test predictions of future loss payments Test on several insurers Main Focus Are there any formulas that can pass these tests? Bayesian CNB does pretty good on CA Schedule P data. Uses information from many insurers Are there other formulas? This paper sets a bar for others to raise.

    52. Subsequent Developments Paper completed in April 2006 Additional critique Describe recent developments Describe ongoing research

    53. PP Plots on Validation Data Clive Keatinge’s Observation Does the leveling of plots at the end indicate that the predicted tails are too light? The plot is still within the KS bounds and thus is not statistically significant. The leveling looks rather systematic.

    54. Alternative to the KS Anderson-Darling Test AD is more sensitive to tails. Critical values are 1.933, 2.492, and 3.857 for 10, 5 and 1% levels respectively. Value for validation sample is 2.966 Not outrageously bad, but Clive has a point. Explanation – Did not reflect all sources of uncertainty??

    55. Is Bayesian Methodology Necessary? “Thinking Outside the Triangle” Paper in June 2007 ASTIN Colloquium Works with simulated data on a similar model Compares Bayesian with maximum likelihood predictive distributions

    56. Maximum Likelihood Fitting Methodology PP Plots for Combined Fits PP plot reveals the S-shape that characterizes overfitting. The tails are too light

    57. Bayesian Fitting Methodology PP Plots for Combined Fits

    58. IN THIS EXAMPLE Maximum Likelihood method understates the true variability I call this “overfitting” i.e. the model fits the data rather than the population Nine parameters fit to 55 points SPECULATION – Overfitting will occur in all maximum likelihood methods and in moment based methods i.e. GLM and Mack

    59. Expository Paper in Preparation Focus on the Bayesian method described in this paper Uses Gibbs sampler to simulate posterior distribution of the results Complete algorithm coded in R Hope to increase population of actuaries who: Understand what the method means Can actually use the method

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