Open AccessNumerical methods for dividend optimization using regime-switching jump-diffusion models
Author(s) -
Zhuo Jin,
George Yin,
Hailiang Yang
Publication year - 2011
Publication title -
mathematical control and related fields
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.658
H-Index - 21
eISSN - 2156-8472
pISSN - 2156-8499
DOI - 10.3934/mcrf.2011.1.21
Subject(s) - markov chain , mathematics , convergence (economics) , sequence (biology) , bellman equation , mathematical optimization , value (mathematics) , simple (philosophy) , jump diffusion , jump , discrete time and continuous time , function (biology) , diffusion , optimal control , statistics , economics , physics , philosophy , epistemology , quantum mechanics , evolutionary biology , biology , genetics , economic growth , thermodynamics
This work develops numerical methods for finding optimal dividend policies to maximize the expected present value of dividend payout, where the surplus follows a regime-switching jump diffusion model and the switching is represented by a continuous-time Markov chain. To approximate the optimal dividend policies or optimal controls, we use Markov chain approximation techniques to construct a discrete-time controlled Markov chain with two components. Under simple conditions, we prove the convergence of the approximation sequence to the surplus process and the convergence of the approximation to the value function. Several examples are provided to demonstrate the performance of the algorithm
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