Venue: arXiv
Year: 2022
Paper: https://arxiv.org/abs/2209.14778
Abstract
A critically important, ubiquitous, and yet poorly understood ingredient in modern deep networks (DNs) is batch normalization (BN), which centers and normalizes the feature maps. To date, only limited progress has been made understanding why BN boosts DN learning and inference performance; work has focused exclusively on showing that BN smooths a DN’s loss landscape. In this paper, we study BN theoretically from the perspective of function approximation; we exploit the fact that most of today’s state-of-the-art DNs are continuous piecewise affine (CPA) splines that fit a predictor to the training data via affine mappings defined over a partition of the input space (the so-called ‘linear regions’). We demonstrate that BN is an unsupervised learning technique that – independent of the DN’s weights or gradient-based learning – adapts the geometry of a DN’s spline partition to match the data. BN provides a ‘smart initialization’ that boosts the performance of DN learning, because it adapts even a DN initialized with random weights to align its spline partition with the data. We also show that the variation of BN statistics between mini-batches introduces a dropout-like random perturbation to the partition boundaries and hence the decision boundary for classification problems. This per mini-batch perturbation reduces overfitting and improves generalization by increasing the margin between the training samples and the decision boundary.