最佳停车
不可见的
独特性
数学
对偶(语法数字)
变分不等式
对偶(序理论)
数学优化
停车时间
对偶间隙
数理经济学
完整信息
马尔可夫过程
贝叶斯概率
计量经济学
最优化问题
数学分析
离散数学
艺术
文学类
统计
作者
Kexin Chen,Junkee Jeon,Hoi Ying Wong
标识
DOI:10.1287/moor.2021.1189
摘要
The optimal retirement decision is an optimal stopping problem when retirement is irreversible. We investigate the optimal consumption, investment, and retirement decisions when the mean return of a risky asset is unobservable and is estimated by filtering from historical prices. To ensure nonnegativity of the consumption rate and the borrowing constraints on the wealth process of the representative agent, we conduct our analysis using a duality approach. We link the dual problem to American option pricing with stochastic volatility and prove that the duality gap is closed. We then apply our theory to a hidden Markov model for regime-switching mean return with Bayesian learning. We fully characterize the existence and uniqueness of variational inequality in the dual optimal stopping problem, as well as the free boundary of the problem. An asymptotic closed-form solution is derived for optimal retirement timing by small-scale perturbation. We discuss the potential applications of the results to other partial-information settings.
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