Related papers: Path Development Network with Finite-dimensional Lie Group Representation

Path Development Network with Finite-dimensional Lie Group Representation

URL: http://arxiv.org/abs/2204.00740v2
Date: Sun, 8 Sep 2024 12:56:04 GMT
Title: Path Development Network with Finite-dimensional Lie Group Representation
Authors: Hang Lou, Siran Li, Hao Ni,
Abstract summary: We propose a novel, trainable path development layer, which exploits representations of sequential data through finite-dimensional Lie groups. Our proposed layer, analogous to recurrent neural networks (RNN), possesses an explicit, simple recurrent unit that alleviates the gradient issues. Empirical results on a range of datasets show that the development layer consistently and significantly outperforms signature features on accuracy and dimensionality.
Score: 3.9983665898166425
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Signature, lying at the heart of rough path theory, is a central tool for analysing controlled differential equations driven by irregular paths. Recently it has also found extensive applications in machine learning and data science as a mathematically principled, universal feature that boosts the performance of deep learning-based models in sequential data tasks. It, nevertheless, suffers from the curse of dimensionality when paths are high-dimensional. We propose a novel, trainable path development layer, which exploits representations of sequential data through finite-dimensional Lie groups, thus resulting in dimension reduction. Its backpropagation algorithm is designed via optimization on manifolds. Our proposed layer, analogous to recurrent neural networks (RNN), possesses an explicit, simple recurrent unit that alleviates the gradient issues. Our layer demonstrates its strength in irregular time series modelling. Empirical results on a range of datasets show that the development layer consistently and significantly outperforms signature features on accuracy and dimensionality. The compact hybrid model (stacking one-layer LSTM with the development layer) achieves state-of-the-art against various RNN and continuous time series models. Our layer also enhances the performance of modelling dynamics constrained to Lie groups. Code is available at https://github.com/PDevNet/DevNet.git.

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