Abstract
<p style='text-indent:20px;'>In this paper, we consider the problem of valuing an equity-linked insurance product with a cliquet-style payoff. The premium is invested in a reference asset whose dynamic is modeled by a geometric Brownian motion. The policy delivers a payment to the beneficiary at either a fixed maturity or the time upon the insured's death, whichever comes first. The residual lifetime of a policyholder is described by a random variable, assumed to be independent of the asset price process, and its distribution is approximated by a linear sum of exponential distributions. Under such characterization, closed-form valuation formulae are derived for the contract considered. Moreover, a discrete-time setting is briefly discussed. Finally, numerical examples are provided to illustrate our proposed approach.</p>
Publisher
American Institute of Mathematical Sciences (AIMS)
Subject
Applied Mathematics,Control and Optimization,Strategy and Management,Business and International Management,Applied Mathematics,Control and Optimization,Strategy and Management,Business and International Management
Reference30 articles.
1. M. J. Brennan, E. S. Schwartz.The pricing of equity-linked life insurance policies with an asset value guarantee, Journal of Financial Economics, 3 (1976), 195-213.
2. N. Bowers, H. U. Gerber, J. C. Hickman, D. A. Jones and C. J. Nesbit, Actuarial Mathematics, 2$^nd$ edition, The Society of Actuaries, Illinois, 1997.
3. P. P. Boyle, E. S. Schwartz.Equilibrium prices of guarantees under equity-linked contracts, Journal of Risk and Insurance, 44 (1977), 639-660.
4. P. P. Boyle, W. Tian.The design of equity-indexed annuities, Insurance Math. Econom., 43 (2008), 303-315.
5. Y. F. Chiu, M. H. Hsieh, C. Tsai.Valuation and analysis on complex equity indexed annuities, Pacific-Basin Finance Journal, 57 (2019), 101175.