Deep Learning via Dynamical Systems: An Approximation Perspective

December 22, 2019 ยท Declared Dead ยท ๐Ÿ› Journal of the European Mathematical Society (Print)

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Authors Qianxiao Li, Ting Lin, Zuowei Shen arXiv ID 1912.10382 Category cs.LG: Machine Learning Cross-listed math.OC, stat.ML Citations 125 Venue Journal of the European Mathematical Society (Print) Last Checked 4 months ago
Abstract
We build on the dynamical systems approach to deep learning, where deep residual networks are idealized as continuous-time dynamical systems, from the approximation perspective. In particular, we establish general sufficient conditions for universal approximation using continuous-time deep residual networks, which can also be understood as approximation theories in $L^p$ using flow maps of dynamical systems. In specific cases, rates of approximation in terms of the time horizon are also established. Overall, these results reveal that composition function approximation through flow maps present a new paradigm in approximation theory and contributes to building a useful mathematical framework to investigate deep learning.
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