Abstract for the talk on 12.06.2020 (17:00 h)Math Machine Learning Group Seminar
Yonatan Dukler (University of California, Los Angeles)
Optimization Theory for ReLU Neural NetworksTrained with Normalization Layers
The success of deep neural networks is in part due to the use of normalization layers. Normalization layers like Batch Normalization, Layer Normalization and Weight Normalization are ubiquitous in practice, as they improve generalization performance and speed up training significantly. Nonetheless, the vast majority of current deep learning theory and non-convex optimization literature focuses on the un-normalized setting, where the functions under consideration do not exhibit the properties of commonly normalized neural networks. In this paper, we bridge this gap by giving the first global convergence result for two-layer neural networks with ReLU activations trained with a normalization layer, namely Weight Normalization. Our analysis shows how the introduction of normalization layers changes the optimization landscape and can enable faster convergence as compared with un-normalized neural networks.
This is joint work with Quanquan Gu and Guido Montufar.