Normalization Propagation: A Parametric Technique for Removing Internal Covariate Shift in Deep Networks
This addresses limitations in training deep networks for researchers and practitioners, though it appears incremental as it builds directly on BN's framework.
The paper tackles the drawbacks of Batch Normalization (BN) by proposing Normalization Propagation, a non-adaptive technique that removes internal covariate shift in deep networks without relying on batch statistics, resulting in computational speed improvements compared to BN.
While the authors of Batch Normalization (BN) identify and address an important problem involved in training deep networks-- Internal Covariate Shift-- the current solution has certain drawbacks. Specifically, BN depends on batch statistics for layerwise input normalization during training which makes the estimates of mean and standard deviation of input (distribution) to hidden layers inaccurate for validation due to shifting parameter values (especially during initial training epochs). Also, BN cannot be used with batch-size 1 during training. We address these drawbacks by proposing a non-adaptive normalization technique for removing internal covariate shift, that we call Normalization Propagation. Our approach does not depend on batch statistics, but rather uses a data-independent parametric estimate of mean and standard-deviation in every layer thus being computationally faster compared with BN. We exploit the observation that the pre-activation before Rectified Linear Units follow Gaussian distribution in deep networks, and that once the first and second order statistics of any given dataset are normalized, we can forward propagate this normalization without the need for recalculating the approximate statistics for hidden layers.