Fractal Geometry in High-Frequency Trading: Modeling Market Microstructure and Price Dynamics

Abdulgaffar Muhammad, John Nma Aliyu, Adedokun Lateef Adetunji, Anthony Kolade Adesugba, Micah Ezekiel Elton Mike, Mohammed Abdulmalik
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Abstract

This theoretical article delves into the intricate world of high-frequency trading (HFT) without empirical testing of real-world data, focusing on the incorporation of fractal geometry principles to enhance our understanding of market microstructure and price dynamics. In the introduction, we outline the significance of this research in the context of modern financial markets and lay out the objectives of our theoretical analysis. The article then takes an in-depth dive into fractal geometry fundamentals, illuminating its core concepts and its relevance within financial markets. Subsequently, the article explores the landscape of high-frequency trading, offering an overview of this dynamic domain and how fractal geometry can be incorporated into trading models. The section on modeling market microstructure presents theoretical approaches to understanding order flow dynamics, including novel derivations and equations. It then transitions into fractal-based approaches for analyzing the complexities of market microstructure, providing both an original perspective and numbered equations. Moreover, this article investigates the theoretical modeling of price dynamics, underscoring the pivotal role of fractal geometry in enriching these models. The discussion revolves around the fundamental autoregressive models and multifractal models, and it elucidates how fractal geometry principles, such as the Hurst exponent, come into play. We explore the self- similarity of price dynamics, fractal dimensions, and how these aspects can be integrated into high-frequency trading strategies. Overall, this article offers a comprehensive theoretical exploration of fractal geometry's implications in the realm of high-frequency trading, providing valuable insights for both researchers and practitioners seeking to fathom the complexities of market microstructure and price dynamics. The incorporation of fractal principles into financial models fosters a deeper understanding of self-similarity and complexity within financial markets, even in the absence of empirical data.
高频交易中的分形几何:模拟市场微观结构和价格动态
这篇理论文章深入研究了高频交易(HFT)的复杂世界,没有对现实世界数据进行实证测试,重点是将分形几何原理结合起来,以增强我们对市场微观结构和价格动态的理解。在引言中,我们概述了本研究在现代金融市场背景下的意义,并阐述了我们理论分析的目标。然后,文章深入探讨了分形几何的基本原理,阐明了其核心概念及其在金融市场中的相关性。随后,本文探讨了高频交易的前景,概述了这一动态领域,以及如何将分形几何纳入交易模型。市场微观结构建模部分介绍了理解订单流动力学的理论方法,包括新的推导和方程。然后转换为基于分形的方法来分析市场微观结构的复杂性,提供原始视角和编号方程。此外,本文还研究了价格动态的理论建模,强调了分形几何在丰富这些模型方面的关键作用。讨论围绕基本的自回归模型和多重分形模型,并阐明了分形几何原理,如赫斯特指数,是如何发挥作用的。我们探讨了价格动态的自相似性,分形维度,以及如何将这些方面整合到高频交易策略中。总体而言,本文对分形几何在高频交易领域的含义进行了全面的理论探索,为研究人员和从业者寻求了解市场微观结构和价格动态的复杂性提供了有价值的见解。将分形原理整合到金融模型中,即使在缺乏经验数据的情况下,也能加深对金融市场自相似性和复杂性的理解。
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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