Your search keyword '"De-Lei Sheng"' showing total 2 results

1. Explicit Solution of Reinsurance-Investment Problem for an Insurer with Dynamic Income under Vasicek Model

Author

De-Lei Sheng

Subjects

Power utility, Stochastic control, Reinsurance, Vasicek model, 021103 operations research, Actuarial science, Article Subject, Physics, QC1-999, Applied Mathematics, Mathematics::Optimization and Control, 0211 other engineering and technologies, General Physics and Astronomy, 02 engineering and technology, Investment (macroeconomics), Short-rate model, 0202 electrical engineering, electronic engineering, information engineering, Econometrics, Economics, 020201 artificial intelligence & image processing, Graphics, Remainder

Abstract

Unlike traditionally used reserves models, this paper focuses on a reserve process with dynamic income to study the reinsurance-investment problem for an insurer under Vasicek stochastic interest rate model. The insurer’s dynamic income is given by the remainder after a dynamic reward budget being subtracted from the insurer’s net premium which is calculated according to expected premium principle. Applying stochastic control technique, a Hamilton-Jacobi-Bellman equation is established and the explicit solution is obtained under the objective of maximizing the insurer’s power utility of terminal wealth. Some economic interpretations of the obtained results are explained in detail. In addition, numerical analysis and several graphics are given to illustrate our results more meticulous.

Published

2016

2. Optimal Time-Consistent Investment Strategy for a DC Pension Plan with the Return of Premiums Clauses and Annuity Contracts

Author

De-Lei Sheng and Ximin Rong

Subjects

Stochastic control, Pension, Actuarial science, Optimization problem, Pension plan, Stochastic volatility, Article Subject, Investment strategy, lcsh:Mathematics, Life annuity, lcsh:QA1-939, Annuity (American), Modeling and Simulation, Economics

Abstract

Defined contribution and annuity contract are merged into one pension plan to study both accumulation phase and distribution phase, which results in such effects that both phases before and after retirement being “defined”. Under the Heston’s stochastic volatility model, this paper focuses on mean-variance insurers with the return of premiums clauses to study the optimal time-consistent investment strategy for the DC pension merged with an annuity contract. Both accumulation phase before retirement and distribution phase after retirement are studied. In the time-consistent framework, the extended Hamilton-Jacobi-Bellman equations associated with the optimization problem are established. Applying stochastic optimal control technique, the time-consistent explicit solutions of the optimal strategies and the efficient frontiers are obtained. In addition, numerical analysis illustrates our results and also deepens our knowledge or understanding of the research results.

Published

2014