Optimal Discrete Hedging in Garman-Kohlhagen Model with Liquidity Risk

机译：流动性风险的Garman-Kohlhagen模型的最佳离散对冲

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In this paper, we study a discrete time hedging and pricing problem using Garman-Kohlhagen model in a market with liquidity costs. We prove that delta hedging is an unique optimal strategy. In particular, the hedging strategy will have expected hedging error is the infinitesimal of the length of the revision interval with order of 3/2. An implicit finite difference method is presented and showed to be stable for solving the PDE required to obtain the option price. Finally, some experiments illustrate the efficiency of our method.

机译：在本文中，我们在利用流动性成本中使用Garman-Kohlhagen模型进行离散时间对冲和定价问题。我们证明了Delta Hedging是一种独特的最佳策略。特别是，对冲策略将预期的对冲误差是修订间隔长度的无限误差，按3/2的顺序。提出了一种隐含的有限差分方法，并显示稳定，用于求解获得所需的PDE所需的PDE。最后，一些实验说明了我们方法的效率。

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《International Conference on Modelling, Computation, and Optimization in Information Systems and Management Sciences》|2015年|xix 500 p.|共12页
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Thanh Duong; Quyen Ho; An Tran; Minh Tran;
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中图分类 G202-532;
关键词
discrete time; Garman-Kohlhagen model; liquidity cost; delta hedging;

机译：离散时间;Garman-Kohlhagen模型;流动性成本;三角洲对冲;

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Optimal Discrete Hedging in Garman-Kohlhagen Model with Liquidity Risk

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