
The author proposes a function space called the Neural Hilbert Ladder (NHL) that can characterize the functions representable by multi-layer neural networks with arbitrary width. The NHL space is defined as an infinite union of reproducing kernel Hilbert spaces (RKHSs) and is associated with a complexity measure that governs both the approximation and generalization properties of neural networks.


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characterizing-the-function-space-explored-by-multi-layer-neural-networks


Characterizing the Function Space Explored by Multi-Layer Neural Networks
