Optimal dividend policies for a class of growth-restricted diffusion processes under transaction costs and solvency constraints

Lihua Bai; Martin Hunting; Jostein Paulsen

Optimal dividend policies for a class of growth-restricted diffusion processes under transaction costs and solvency constraints

Lihua Bai, Martin Hunting, Jostein Paulsen

Institut for Matematiske Fag

14 Citationer (Scopus)

Abstract

In this paper, we consider a company whose surplus follows a rather general diffusion process and whose objective is to maximize expected discounted dividend payments. With each dividend payment, there are transaction costs and taxes, and it is shown in Paulsen (Adv. Appl. Probab. 39:669-689, 2007) that under some reasonable assumptions, optimality is achieved by using a lump sum dividend barrier strategy, i. e., there is an upper barrier ū* and a lower barrier u* so that whenever the surplus reaches ū*, it is reduced to ū* through a dividend payment. However, these optimal barriers may be unacceptably low from a solvency point of view. It is argued that, in that case, one should still look for a barrier strategy, but with barriers that satisfy a given constraint. We propose a solvency constraint similar to that in Paulsen (Finance Stoch. 4:457-474, 2003); whenever dividends are paid out, the probability of ruin within a fixed time T and with the same strategy in the future should not exceed a predetermined level ε. It is shown how optimality can be achieved under this constraint, and numerical examples are given.

Originalsprog	Engelsk
Tidsskrift	Finance and Stochastics
Vol/bind	16
Udgave nummer	3
Sider (fra-til)	477-511
Antal sider	35
ISSN	0949-2984
Status	Udgivet - jul. 2012

Citationsformater

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AU - Hunting, Martin

AU - Paulsen, Jostein

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N2 - In this paper, we consider a company whose surplus follows a rather general diffusion process and whose objective is to maximize expected discounted dividend payments. With each dividend payment, there are transaction costs and taxes, and it is shown in Paulsen (Adv. Appl. Probab. 39:669-689, 2007) that under some reasonable assumptions, optimality is achieved by using a lump sum dividend barrier strategy, i. e., there is an upper barrier ū* and a lower barrier u* so that whenever the surplus reaches ū*, it is reduced to ū* through a dividend payment. However, these optimal barriers may be unacceptably low from a solvency point of view. It is argued that, in that case, one should still look for a barrier strategy, but with barriers that satisfy a given constraint. We propose a solvency constraint similar to that in Paulsen (Finance Stoch. 4:457-474, 2003); whenever dividends are paid out, the probability of ruin within a fixed time T and with the same strategy in the future should not exceed a predetermined level ε. It is shown how optimality can be achieved under this constraint, and numerical examples are given.

AB - In this paper, we consider a company whose surplus follows a rather general diffusion process and whose objective is to maximize expected discounted dividend payments. With each dividend payment, there are transaction costs and taxes, and it is shown in Paulsen (Adv. Appl. Probab. 39:669-689, 2007) that under some reasonable assumptions, optimality is achieved by using a lump sum dividend barrier strategy, i. e., there is an upper barrier ū* and a lower barrier u* so that whenever the surplus reaches ū*, it is reduced to ū* through a dividend payment. However, these optimal barriers may be unacceptably low from a solvency point of view. It is argued that, in that case, one should still look for a barrier strategy, but with barriers that satisfy a given constraint. We propose a solvency constraint similar to that in Paulsen (Finance Stoch. 4:457-474, 2003); whenever dividends are paid out, the probability of ruin within a fixed time T and with the same strategy in the future should not exceed a predetermined level ε. It is shown how optimality can be achieved under this constraint, and numerical examples are given.

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JO - Finance and Stochastics

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Optimal dividend policies for a class of growth-restricted diffusion processes under transaction costs and solvency constraints

Abstract

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