Explore the mathematical foundations of deep neural networks in this lecture from the TRIAD Distinguished Lecture Series. Delve into the statistical theory behind deep ReLU networks as Johannes Schmidt-Hieber presents the fourth installment of his five-part series. Examine the specific properties of the ReLU activation function, focusing on its relationship to skipping connections and efficient polynomial approximation. Gain insights into how risk bounds can be derived for sparsely connected networks. Enhance your understanding of the theoretical underpinnings that support recent advancements in estimating the risk associated with deep ReLU networks.
Mathematics for Deep Neural Networks: Statistical Theory for Deep ReLU Networks - Lecture 4
Georgia Tech Research via YouTube
Overview
Syllabus
TRIAD Distinguished Lecture Series | Johannes Schmidt-Hieber Lecture 4 (of 5)
Taught by
Georgia Tech Research
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