Clustering Market Regimes Using the Wasserstein Distance

SSRN Pub Date : 2021-10-22 DOI:10.2139/ssrn.3947905

Blanka Horvath, Zacharia Issa, Aitor Muguruza Gonzalez

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引用次数: 6

Abstract

The problem of rapid and automated detection of distinct market regimes is a topic of great interest to financial mathematicians and practitioners alike. In this paper, we outline an unsupervised learning algorithm for clustering financial time-series into a suitable number of temporal segments (market regimes). As a special case of the above, we develop a robust algorithm that automates the process of classifying market regimes. The method is robust in the sense that it does not depend on modelling assumptions of the underlying time series as our experiments with real datasets show. This method -- dubbed the Wasserstein $k$-means algorithm -- frames such a problem as one on the space of probability measures with finite $p^\text{th}$ moment, in terms of the $p$-Wasserstein distance between (empirical) distributions. We compare our WK-means approach with a more traditional clustering algorithms by studying the so-called maximum mean discrepancy scores between, and within clusters. In both cases it is shown that the WK-means algorithm vastly outperforms all considered competitor approaches. We demonstrate the performance of all approaches both in a controlled environment on synthetic data, and on real data.

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利用Wasserstein距离聚类市场机制

快速、自动地检测不同的市场制度是金融数学家和从业者都非常感兴趣的话题。在本文中，我们概述了一种无监督学习算法，用于将金融时间序列聚类为适当数量的时间段（市场制度）。作为上述情况的一个特例，我们开发了一种稳健的算法，可以自动对市场制度进行分类。该方法是稳健的，因为它不依赖于底层时间序列的建模假设，正如我们对真实数据集的实验所表明的那样。这种方法被称为Wasserstein$k$-均值算法，根据（经验）分布之间的$p$-Waserstein距离，将这样一个问题定义为具有有限$p^\text｛th｝$矩的概率测度空间上的问题。我们通过研究聚类之间和聚类内所谓的最大均值差异分数，将我们的WK均值方法与更传统的聚类算法进行了比较。在这两种情况下，WK均值算法都大大优于所有考虑的竞争对手方法。我们展示了所有方法在受控环境中对合成数据和真实数据的性能。

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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