May 2019
tl;dr: Pruning filters by minimizing feature map reconstruction error.
This paper is highly related to pruning filters which uses L1 norm to prune filters. The paper is also highly influential in model compression field, with 224 citation as of 05/26/2019.
The paper demonstrated that Pruning Filters (max response) with L1 norm is sometimes worse than random pruning. It is argued that max response ignored correlation between different filters. Filters with large absolute weight may have strong correlation.
See LeGR for a more recent review and update of this work.
- This paper focuses on redundancy of feature maps, rather than filters themselves. Inference time for channel pruning, utilizing inter-channel redundancy.
- Minimization of reconstruction error is achieved in two steps: channel selection with Lasso and feature map reconstruction with linear least squares.
- Training based methods integrate sparse constraints in the training process. This is more costly than inference based approaches.
- The paper works on feature maps and thus is not a data-free method (needs sample data to generate feature maps). Methods working directly on filters are data-free.
- Frobenius norm is the sqrt of sum of L2 norm of all elements (maybe can be called "element-wise" L2?).
- Questions and notes on how to improve/revise the current work