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Main Authors: Wang, Wenyuan, Xu, Zuo Quan, Yamazaki, Kazutoshi, Yan, Kaixin, Zhou, Xiaowen
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2502.05839
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author Wang, Wenyuan
Xu, Zuo Quan
Yamazaki, Kazutoshi
Yan, Kaixin
Zhou, Xiaowen
author_facet Wang, Wenyuan
Xu, Zuo Quan
Yamazaki, Kazutoshi
Yan, Kaixin
Zhou, Xiaowen
contents In this paper, we examine a modified version of de Finetti's optimal dividend problem, incorporating fixed transaction costs and altering the surplus process by introducing two-valued drift and two-valued volatility coefficients. This modification aims to capture the transitions or adjustments in the company's financial status. We identify the optimal dividend strategy, which maximizes the expected total net dividend payments (after accounting for transaction costs) until ruin, as a two-barrier impulsive dividend strategy. Notably, the optimal strategy can be explicitly determined for almost all scenarios involving different drifts and volatility coefficients. Our primary focus is on exploring how changes in drift and volatility coefficients influence the optimal dividend strategy.
format Preprint
id arxiv_https___arxiv_org_abs_2502_05839
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle De Finetti's problem with fixed transaction costs and regime switching
Wang, Wenyuan
Xu, Zuo Quan
Yamazaki, Kazutoshi
Yan, Kaixin
Zhou, Xiaowen
Mathematical Finance
Risk Management
In this paper, we examine a modified version of de Finetti's optimal dividend problem, incorporating fixed transaction costs and altering the surplus process by introducing two-valued drift and two-valued volatility coefficients. This modification aims to capture the transitions or adjustments in the company's financial status. We identify the optimal dividend strategy, which maximizes the expected total net dividend payments (after accounting for transaction costs) until ruin, as a two-barrier impulsive dividend strategy. Notably, the optimal strategy can be explicitly determined for almost all scenarios involving different drifts and volatility coefficients. Our primary focus is on exploring how changes in drift and volatility coefficients influence the optimal dividend strategy.
title De Finetti's problem with fixed transaction costs and regime switching
topic Mathematical Finance
Risk Management
url https://arxiv.org/abs/2502.05839