Optimal Stock Selling/Buying Strategy with Reference to the Ultimate Average

16 Pages Posted: 28 Jul 2008

See all articles by Min Dai

Min Dai

The Hong Kong Polytechnic University

Yifei Zhong

University of Oxford - Mathematical Institute; University of Oxford - Mathematical Institute

Date Written: July 15, 2008

Abstract

We are concerned with the optimal decision to sell or buy a stock in a given period with reference to the ultimate average of the stock price. Strictly speaking, we aim to determine an optimal selling (buying) time so as to maximize (minimize) the expectation of the ratio of the selling (buying) price to the ultimate average price over the period. This is an optimal stopping time problem which can be formulated as a variational inequality problem. The associated stopping region corresponds to the optimal selling (buying) strategy. We provide a partial differential equation approach to study the optimal strategy. It turns out that the optimal selling strategy is bang-bang, which is the same as that obtained by Shiryaev, Xu and Zhou (2008) taking the ultimate maximum of the stock price as the benchmark. However, the optimal buying strategy can be a feedback one subject to the type of average and parameter values.

Keywords: optimal strategy, average price, optimal stopping problem, variational inequality

JEL Classification: Q80 Q35, G60, G40, B91, B28

Suggested Citation

Dai, Min and Zhong, Yifei, Optimal Stock Selling/Buying Strategy with Reference to the Ultimate Average (July 15, 2008). Available at SSRN: https://ssrn.com/abstract=1182842 or http://dx.doi.org/10.2139/ssrn.1182842

Min Dai (Contact Author)

The Hong Kong Polytechnic University ( email )

Yifei Zhong

University of Oxford - Mathematical Institute ( email )

Mathematical Institute
24-29 St Giles
Oxford, Oxfordshire OX1 3LB
United Kingdom

University of Oxford - Mathematical Institute ( email )

24-29 St Giles'
Oxford, OX1 3LB
United Kingdom

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