用于条件时间序列生成的 Sig-Wasserstein GANs

IF 1.6 3区 经济学 Q3 BUSINESS, FINANCE
Shujian Liao, Hao Ni, Marc Sabate-Vidales, Lukasz Szpruch, Magnus Wiese, Baoren Xiao
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引用次数: 0

摘要

生成式对抗网络(GAN)在从看似高维的概率度量生成样本方面非常成功。然而,这些方法很难捕捉到时间序列数据引起的联合概率分布的时间依赖性。此外,长时间序列数据流大大增加了目标空间的维度,这可能会导致生成建模不可行。为了克服这些挑战,受计量经济学中自回归模型的启发,我们对给定过去信息的未来时间序列的条件分布很感兴趣。我们提出了通用条件 Sig-WGAN 框架,将 Wasserstein-GANs (WGANs) 与数学原理上高效的路径特征提取(称为路径签名)相结合。路径签名是一个分级的统计序列,为数据流提供了通用描述,其期望值表征了时间序列模型的规律。我们特别开发了条件 Sig- W 1 $W_1$ 度量,它捕捉了时间序列模型的条件联合规律,并将其用作判别器。签名特征空间能够明确表示所提出的判别器,从而减少了昂贵的训练需求。我们在合成数据集和经验数据集上验证了我们的方法,并观察到我们的方法在相似度和预测能力方面始终显著优于最先进的基准。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Sig-Wasserstein GANs for conditional time series generation

Sig-Wasserstein GANs for conditional time series generation

Generative adversarial networks (GANs) have been extremely successful in generating samples, from seemingly high-dimensional probability measures. However, these methods struggle to capture the temporal dependence of joint probability distributions induced by time-series data. Furthermore, long time-series data streams hugely increase the dimension of the target space, which may render generative modeling infeasible. To overcome these challenges, motivated by the autoregressive models in econometric, we are interested in the conditional distribution of future time series given the past information. We propose the generic conditional Sig-WGAN framework by integrating Wasserstein-GANs (WGANs) with mathematically principled and efficient path feature extraction called the signature of a path. The signature of a path is a graded sequence of statistics that provides a universal description for a stream of data, and its expected value characterizes the law of the time-series model. In particular, we develop the conditional Sig- W 1 $W_1$ metric that captures the conditional joint law of time series models and use it as a discriminator. The signature feature space enables the explicit representation of the proposed discriminators, which alleviates the need for expensive training. We validate our method on both synthetic and empirical dataset and observe that our method consistently and significantly outperforms state-of-the-art benchmarks with respect to measures of similarity and predictive ability.

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来源期刊
Mathematical Finance
Mathematical Finance 数学-数学跨学科应用
CiteScore
4.10
自引率
6.20%
发文量
27
审稿时长
>12 weeks
期刊介绍: Mathematical Finance seeks to publish original research articles focused on the development and application of novel mathematical and statistical methods for the analysis of financial problems. The journal welcomes contributions on new statistical methods for the analysis of financial problems. Empirical results will be appropriate to the extent that they illustrate a statistical technique, validate a model or provide insight into a financial problem. Papers whose main contribution rests on empirical results derived with standard approaches will not be considered.
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