ASSET ALLOCATION AND ANNUITY‐PURCHASE STRATEGIES TO MINIMIZE THE PROBABILITY OF FINANCIAL RUIN

In this paper, we derive the optimal investment and annuitization strategies for a retiree whose objective is to minimize the probability of lifetime ruin, namely the probability that a fixed consumption strategy will lead to zero wealth while the individual is still alive. Recent papers in the insurance economics literature have examined utility-maximizing annuitization strategies. Others in the probability, finance, and risk management literature have derived shortfall-minimizing investment and hedging strategies given a limited amount of initial capital. This paper brings the two strands of research together. Our model pre-supposes a retiree who does not currently have sufficient wealth to purchase a life annuity that will yield her exogenously desired fixed consumption level. She seeks the asset allocation and annuitization strategy that will minimize the probability of lifetime ruin. We demonstrate that because of the binary nature of the investor's goal, she will not annuitize any of her wealth until she can fully cover her desired consumption with a life annuity. We derive a variational inequality that governs the ruin probability and the optimal strategies, and we demonstrate that the problem can be recast as a related optimal stopping problem which yields a free-boundary problem that is more tractable. We numerically calculate the ruin probability and optimal strategies and examine how they change as we vary the mortality assumption and parameters of the financial model. Moreover, for the special case of exponential future lifetime, we solve the (dual) problem explicitly. As a byproduct of our calculations, we are able to quantify the reduction in lifetime ruin probability that comes from being able to manage the investment portfolio dynamically and purchase annuities.

[1]  P. Wilmott,et al.  Option pricing: Mathematical models and computation , 1994 .

[2]  W. Fleming,et al.  Hedging in incomplete markets with HARA utility , 1997 .

[3]  A. Roy SAFETY-FIRST AND HOLDING OF ASSETS , 1952 .

[4]  Avner Friedman,et al.  A variational inequality approach to financial valuation of retirement benefits based on salary , 2002, Finance Stochastics.

[5]  V. Young,et al.  Optimal and Simple, Nearly Optimal Rules for Minimizing the Probability Of Financial Ruin in Retirement , 2006 .

[6]  Optimal Investment Strategy to Minimize the Probability of Lifetime Ruin , 2004 .

[7]  H. Soner,et al.  Optimal Investment and Consumption with Transaction Costs , 1994 .

[8]  C. Copeland An Analysis of the Retirement and Pension Plan Coverage Topical Module of Sipp , 2002, EBRI issue brief.

[9]  Eduardo S. Schwartz,et al.  Investment Under Uncertainty. , 1994 .

[10]  Jack L. VanDerhei,et al.  Can America Afford Tomorrow's Retirees: Results from the Ebri-Erf Retirement Security Projection Model , 2003, EBRI issue brief.

[11]  J. Michael Harrison,et al.  Instantaneous Control of Brownian Motion , 1983, Math. Oper. Res..

[12]  Sid Browne,et al.  Optimal Investment Policies for a Firm With a Random Risk Process: Exponential Utility and Minimizing the Probability of Ruin , 1995, Math. Oper. Res..

[13]  A. Roy Safety first and the holding of assetts , 1952 .

[14]  B. Øksendal Stochastic differential equations : an introduction with applications , 1987 .

[15]  H. Gerber,et al.  Actuarial Mathematics, second edition , 1997 .

[16]  M. Feldstein,et al.  Individual Risk in an Investment-Based Social Security System , 2001 .

[17]  Hans U. Gerber,et al.  An introduction to mathematical risk theory , 1982 .

[18]  Hyeng Keun Koo,et al.  Consumption and Portfolio Selection with Labor Income: A Continuous Time Approach , 1998 .

[19]  A. R. Norman,et al.  Portfolio Selection with Transaction Costs , 1990, Math. Oper. Res..

[20]  Scott F. Richard,et al.  Optimal consumption, portfolio and life insurance rules for an uncertain lived individual in a continuous time model , 1975 .

[21]  Ruined Moments in Your Life: How Good are the Approximations? , 2004 .

[22]  J. Poterba The History of Annuities in the United States , 1997 .

[23]  Sid Browne,et al.  The Risk and Rewards of Minimizing Shortfall Probability , 1999 .

[24]  Erhan Bayraktar,et al.  Minimizing the probability of lifetime ruin under borrowing constraints , 2007 .

[25]  Chris Robinson,et al.  Self-Annuitization and Ruin in Retirement , 2000 .

[26]  Virginia R. Young,et al.  Annuitization and asset allocation , 2007, 1506.05990.

[27]  A. Brugiavini Uncertainty resolution and the timing of annuity purchases , 1993 .

[28]  T. Zariphopoulou,et al.  Investment-consumption models with transaction costs and Markov-chain parameters , 1990, 29th IEEE Conference on Decision and Control.

[29]  S. Browne Reaching goals by a deadline: digital options and continuous-time active portfolio management , 1996, Advances in Applied Probability.

[30]  Sid Browne,et al.  Beating a moving target: Optimal portfolio strategies for outperforming a stochastic benchmark , 1999, Finance Stochastics.

[31]  Thaleia Zariphopoulou Investment-consumption models with transaction fees and Markov-chain parameters , 1992 .

[32]  Sandeep Kapur,et al.  A Portfolio Approach to Investment and Annuitization During Retirement , 1999 .

[33]  Thaleia Zariphopoulou,et al.  Stochastic control methods in asset pricing , 2001 .

[34]  M. Yaari,et al.  Uncertain lifetime, life insurance, and the theory of the consumer , 1965 .