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arxiv: 1810.01877 · v3 · pith:ENYBLCFBnew · submitted 2018-10-03 · 💻 cs.LG · stat.ML

Understanding Weight Normalized Deep Neural Networks with Rectified Linear Units

classification 💻 cs.LG stat.ML
keywords normalizedweightdeepnetworksneuralapproximationcapacitycontrol
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This paper presents a general framework for norm-based capacity control for $L_{p,q}$ weight normalized deep neural networks. We establish the upper bound on the Rademacher complexities of this family. With an $L_{p,q}$ normalization where $q\le p^*$, and $1/p+1/p^{*}=1$, we discuss properties of a width-independent capacity control, which only depends on depth by a square root term. We further analyze the approximation properties of $L_{p,q}$ weight normalized deep neural networks. In particular, for an $L_{1,\infty}$ weight normalized network, the approximation error can be controlled by the $L_1$ norm of the output layer, and the corresponding generalization error only depends on the architecture by the square root of the depth.

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