Adaptive Optimal Market Making Strategies with Inventory Liquidation Cost

IF 1.4 4区经济学 Q3 BUSINESS, FINANCE

SIAM Journal on Financial Mathematics Pub Date : 2024-07-31 DOI:10.1137/23m1571058

Jonathan Chávez-Casillas, José E. Figueroa-López, Chuyi Yu, Yi Zhang

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引用次数: 0

Abstract

SIAM Journal on Financial Mathematics, Volume 15, Issue 3, Page 653-699, September 2024.
Abstract.A novel high-frequency market making approach in discrete time is proposed that admits closed-form solutions. By taking advantage of demand functions that are linear in the quoted bid and ask spreads with random coefficients, we model the variability of the partial filling of limit orders posted in a limit order book (LOB). As a result, we uncover new patterns as to how the demand’s randomness affects the optimal placement strategy. We also allow the price process to follow general dynamics without any Brownian or martingale assumption as is commonly adopted in the literature. The most important feature of our optimal placement strategy is that it can react or adapt to the behavior of market orders online. Using LOB data, we train our model and reproduce the anticipated final profit and loss of the optimal strategy on a given testing date using the actual flow of orders in the LOB. Our adaptive optimal strategies outperform the nonadaptive strategy and those that quote limit orders at a fixed distance from the midprice.

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有库存清算成本的自适应最优市场决策策略

SIAM 金融数学期刊》，第 15 卷第 3 期，第 653-699 页，2024 年 9 月。摘要.本文提出了一种新颖的离散时间高频做市方法，并给出了闭式解。通过利用在报价买入价和卖出价差中具有线性随机系数的需求函数，我们对在限价订单簿（LOB）中发布的限价订单部分成交的可变性进行了建模。因此，我们发现了需求随机性如何影响最优配售策略的新模式。我们还允许价格过程遵循一般动态，而不采用文献中通常采用的布朗或马氏假设。我们的最优配售策略最重要的特点是，它可以对在线市场订单的行为做出反应或适应。利用 LOB 数据，我们训练了模型，并利用 LOB 中的实际订单流重现了最优策略在给定测试日期的预期最终盈亏。我们的自适应最优策略的表现优于非自适应策略，也优于那些以中间价固定距离报价限价订单的策略。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

SIAM Journal on Financial Mathematics MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-

CiteScore

2.30

自引率

10.00%

发文量

期刊介绍： SIAM Journal on Financial Mathematics (SIFIN) addresses theoretical developments in financial mathematics as well as breakthroughs in the computational challenges they encompass. The journal provides a common platform for scholars interested in the mathematical theory of finance as well as practitioners interested in rigorous treatments of the scientific computational issues related to implementation. On the theoretical side, the journal publishes articles with demonstrable mathematical developments motivated by models of modern finance. On the computational side, it publishes articles introducing new methods and algorithms representing significant (as opposed to incremental) improvements on the existing state of affairs of modern numerical implementations of applied financial mathematics.