正则化最优执行问题及其奇异极限

Q3 Mathematics
M. Souza, Yuri Thamsten
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引用次数: 2

摘要

我们在波动性和流动性都不确定的框架下研究投资组合执行问题。在我们的模型中,我们假设一个多维马尔可夫随机因素驱动两者。此外,我们将间接流动性成本建模为临时价格影响,并规定了将其与代理商的流动率联系起来的幂律。我们首先分析了正则化设置,其中可接受策略不能确保完全执行初始库存。证明了Hamilton-Jacobi-Bellman方程连续有界黏度解的存在唯一性,得到了最优交易率的刻画。作为我们证明的副产品,我们得到了一个数值算法。然后,我们分析了约束问题,其中可接受策略必须保证交易者完全执行。我们通过单调性参数求解,得到了正则化对应物的奇异极限作为最优策略。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On Regularized Optimal Execution Problems and Their Singular Limits
We investigate the portfolio execution problem under a framework in which volatility and liquidity are both uncertain. In our model, we assume that a multidimensional Markovian stochastic factor drives both of them. Moreover, we model indirect liquidity costs as temporary price impact, stipulating a power law to relate it to the agent's turnover rate. We first analyse the regularized setting, in which the admissible strategies do not ensure complete execution of the initial inventory. We prove the existence and uniqueness of a continuous and bounded viscosity solution of the Hamilton–Jacobi–Bellman equation, whence we obtain a characterization of the optimal trading rate. As a byproduct of our proof, we obtain a numerical algorithm. Then, we analyse the constrained problem, in which admissible strategies must guarantee complete execution to the trader. We solve it through a monotonicity argument, obtaining the optimal strategy as a singular limit of the regularized counterparts.
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来源期刊
Applied Mathematical Finance
Applied Mathematical Finance Economics, Econometrics and Finance-Finance
CiteScore
2.30
自引率
0.00%
发文量
6
期刊介绍: The journal encourages the confident use of applied mathematics and mathematical modelling in finance. The journal publishes papers on the following: •modelling of financial and economic primitives (interest rates, asset prices etc); •modelling market behaviour; •modelling market imperfections; •pricing of financial derivative securities; •hedging strategies; •numerical methods; •financial engineering.
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