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AAS Thematic issue: “Mortality: from Lee–Carter to AI”

Published online by Cambridge University Press:  09 June 2022

Jennifer Alonso-García*
Affiliation:
Université Libre de Bruxelles, Brussels, 1050, Belgium ARC Centre of Excellence in Population Ageing Research (CEPAR), Kensington, NSW, 2033, Australia Netspar, Tilburg, 5037 AB, The Netherlands
*
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Abstract

Type
Editorial
Copyright
© The Author(s), 2022. Published by Cambridge University Press on behalf of Institute and Faculty of Actuaries

Exactly 11 years ago, Sweeting (Reference Sweeting2011) noted in his Editorial that “Even with the uncertainties around the choices of models and parameters, [stochastic mortality modeling] can be used to give a probabilistic assessment of the range of outcomes”. A quick read through past issues of Annals of Actuarial Science shows us that mortality modelling is still a hot topic in actuarial science, as evidenced in the multiple papers that have aimed at innovating towards the most suitable mathematical frameworks and model specifications.

The past three decades have been characterised by a myriad of developments, Li & Lee (Reference Li and Lee2005), Cairns et al. (Reference Cairns, Blake and Dowd2006), Renshaw & Haberman (Reference Renshaw and Haberman2006) to cite a few, raising the need for a useful overview in both modelling and forecasting. Booth & Tickle (Reference Booth and Tickle2008), in their exhaustive work, review the main methodological developments in (stochastic) mortality modelling from 1980 onwards focusing not only on Lee–Carter or GLM-based methodologies but also on parametric models and old-age mortality. In the same vein, Li (Reference Li2014) focuses exclusively on simulation strategies. After sticking to a Lee & Carter (Reference Lee and Carter1992) model, and given the explosion of scientific papers focusing on how to best account for forecasting uncertainty, Li (Reference Li2014) asks the simple question: What is the best performing simulation strategy? The answer is: it depends on the model fit; furthermore the choice of forecasting procedure matters. Clearly, attention has to be put into how the base model fits the data before focusing on the forecast. If there are unusual patterns in the residuals caused, e.g. by a non-captured cohort effect, the results produced by different simulation techniques could vary substantially.

There is consensus about residuals needing to be pattern-free for a model to be well performing. This observation motivated Renshaw & Haberman (Reference Renshaw and Haberman2006) to generalize the classical Lee & Carter (Reference Lee and Carter1992) model, adding a cohort component. They show that adding such a cohort effect renders the residual plots pattern-free. However, since cohort is directly related to age and period, identifiability issues arise due to the collinearity between these three parameters. This could be particularly problematic when projecting future mortality rates. Hunt & Blake (Reference Hunt and Blake2020) focus on this particular issue. They highlight that some identifiability constraints are arbitrary and have an impact on the trend of particular parameters. Hence, they propose to determine which features of the parameters are data driven or choice driven. Based only on the data-driven trends, a selection for the time series should be done, ensuring that the forecast does not depend on arbitrary choices.

Another way of studying mortality is not by extrapolating aggregate trends with a suitable model, but by studying the underlying causes of death. This allows for an analysis of causal mortality, as well as the dependence between different competing causes. Indeed, if you die from cardiovascular disease, you simply cannot have also died in a car accident. Alai et al. (Reference Alai, Arnold and Sherris2015) present a multinomial logistic framework to incorporate cause of death into mortality analysis. As others in the literature, they obtain estimates that are more conservative with regard to longevity, finding lower long-term increase than average. This stems from a failure to exploit information obtained from the aggregate trend and only relying on cause-of-death dependent mortality forecasts (Wilmoth Reference Wilmoth1995). Recent contributions to reconcile forecasting to account for this phenomenon could increase popularity of these models (Li et al. Reference Li, Li, Lu and Panagiotelis2019). Indeed, only a model of this sort allows us to study the effect of eliminating a cause, that is, answering the question “What if a medical treatment is found for cancer?”.

The reader soon realises that there are plenty of choices to be made in estimation and forecasting and that they require careful consideration. Aiming to integrate these decisions, Fung et al. (Reference Fung, Peters and Shevchenko2017) propose a Bayesian model to estimate and forecast under a unified framework, which, despite an increase in model complexity, provides better performing model fits. This work contributes to the recent rise of interest in Bayesian-based approaches to mortality modelling, see, e.g., Antonio et al. (Reference Antonio, Bardoutsos and Ouburg2015) for a useful overview of the literature.

Li & Lee (Reference Li and Lee2005) presented an extension of the Lee & Carter (Reference Lee and Carter1992) model by studying mortality within a multi-population context, whereby countries with similar economic performance are expected to have similar long-term mortality trends. Existing frameworks produced sometimes diverging long-term trends. Building on this work, already applied in the practical context to build life tables in countries like Belgium and The Netherlands (Antonio et al. Reference Antonio, Devriendt, de Boer, de Vries, De Waegenaere, Kan, Kromme, Ouburg, Schulteis, Slagter, van der Winden, van Iersel and Vellekoop2017), recent contributions have been made in the pages of our journal. First, on the model choice, Li & Lee’s framework follows closely the common and country-specific parameter choice as given by Lee & Carter (Reference Lee and Carter1992). To overcome this restriction, Richman & Wüthrich (Reference Richman and Wüthrich2021) use neural networks to choose an optimal model structure. Their model, fit to various countries, provides a very good forecasting performance and has the clear advantage that no ex-ante choices on structure need to be made. Second, on an application to study heterogeneity in mortality (Wen et al. Reference Wen, Cairns and Kleinow2021), the seminal work of Li & Lee (Reference Li and Lee2005) studied mortality between different countries. However, Wen et al. (Reference Wen, Cairns and Kleinow2021) exploit the multi-population setting to say something about the mortality per socio-economic group. This is of particular interest as various public pension reforms are based on the representative agent, whereas in reality big differences arise between socio-economic groups. Wen et al. (Reference Wen, Cairns and Kleinow2021) study different specifications of the multi-population model to conclude that models that incorporate a group-specific time trend outperform models with a common global period effect, suggesting that both the base mortality and long-term trend differ per socio-economic category.

A final contribution that I would like to highlight is that of Spreeuw & Owadally (Reference Spreeuw and Owadally2013) on the dependence of joint lives. Most actuarial research, including of course the papers I discuss in this Editorial, focuses on mortality for a given gender, country or cause. However, the random remaining lifetime is always studied as an isolated independent individual event when over 60% of people in the UK, and most western countries, live in a couple. The authors show, using a North American life insurance data set, that mortality rates significantly increase after the death of the partner but that the dependence is only short term. As researchers and insurers, we need to keep in mind this broken-heart phenomenon and adjust our modelling accordingly.

References

Alai, D.H., Arnold, S. & Sherris, M. (2015). Modelling cause-of-death mortality and the impact of cause-elimination. Annals of Actuarial Science, 9(1), 167186.CrossRefGoogle Scholar
Antonio, K., Bardoutsos, A. & Ouburg, W. (2015). Bayesian poisson log-bilinear models for mortality projections with multiple populations. European Actuarial Journal, 5(2), 245281.CrossRefGoogle Scholar
Antonio, K., Devriendt, S., de Boer, W., de Vries, R., De Waegenaere, A., Kan, H.-K., Kromme, E., Ouburg, W., Schulteis, T., Slagter, E., van der Winden, M, van Iersel, C. & Vellekoop, M. (2017). Producing the dutch and belgian mortality projections: a stochastic multi-population standard. European Actuarial Journal, 7(2), 297336.CrossRefGoogle Scholar
Booth, H. & Tickle, L. (2008). Mortality modelling and forecasting: a review of methods. Annals of Actuarial science, 3(1–2), 343.10.1017/S1748499500000440CrossRefGoogle Scholar
Cairns, A.J., Blake, D. & Dowd, K. (2006). A two-factor model for stochastic mortality with parameter uncertainty: theory and calibration. Journal of Risk and Insurance, 73(4), 687718.10.1111/j.1539-6975.2006.00195.xCrossRefGoogle Scholar
Fung, M.C., Peters, G.W. & Shevchenko, P.V. (2017). A unified approach to mortality modelling using state-space framework: characterisation, identification, estimation and forecasting. Annals of Actuarial Science, 11(2), 343389.CrossRefGoogle Scholar
Hunt, A. & Blake, D. (2020). Identifiability in age/period/cohort mortality models. Annals of Actuarial Science, 14(2), 500536.CrossRefGoogle Scholar
Lee, R.D. & Carter, L.R. (1992). Modeling and forecasting us mortality. Journal of the American Statistical Association, 87(419), 659671.Google Scholar
Li, H., Li, H., Lu, Y. & Panagiotelis, A. (2019). A forecast reconciliation approach to cause-of-death mortality modeling. Insurance: Mathematics and Economics, 86, 122133.Google Scholar
Li, J. (2014). A quantitative comparison of simulation strategies for mortality projection. Annals of Actuarial Science, 8(2), 281297.CrossRefGoogle Scholar
Li, N. & Lee, R. (2005). Coherent mortality forecasts for a group of populations: an extension of the Lee-Carter method. Demography, 42(3), 575594.CrossRefGoogle ScholarPubMed
Renshaw, A.E. & Haberman, S. (2006). A cohort-based extension to the lee–carter model for mortality reduction factors. Insurance: Mathematics and Economics, 38(3), 556570.Google Scholar
Richman, R. & Wüthrich, M.V. (2021). A neural network extension of the lee–carter model to multiple populations. Annals of Actuarial Science, 15(2), 346366.CrossRefGoogle Scholar
Spreeuw, J. & Owadally, I. (2013). Investigating the broken-heart effect: a model for short-term dependence between the remaining lifetimes of joint lives. Annals of Actuarial Science, 7(2), 236257.CrossRefGoogle Scholar
Sweeting, P. (2011). The usefulness of stochastic mortality modelling. Annals of Actuarial Science, 5(2), 139141. doi: 10.1017/S1748499511000212.CrossRefGoogle Scholar
Wen, J., Cairns, A.J. & Kleinow, T. (2021). Fitting multi-population mortality models to socio-economic groups. Annals of Actuarial Science, 15(1), 144172.CrossRefGoogle Scholar
Wilmoth, J.R. (1995). Are mortality projections always more pessimistic when disaggregated by cause of death? Mathematical Population Studies, 5(4), 293319.CrossRefGoogle ScholarPubMed