Linking average- and worst-case perturbation robustness via class selectivity and dimensionality


Abstract in English

Representational sparsity is known to affect robustness to input perturbations in deep neural networks (DNNs), but less is known about how the semantic content of representations affects robustness. Class selectivity-the variability of a units responses across data classes or dimensions-is one way of quantifying the sparsity of semantic representations. Given recent evidence that class selectivity may not be necessary for, and in some cases can impair generalization, we investigate whether it also confers robustness (or vulnerability) to perturbations of input data. We found that networks regularized to have lower levels of class selectivity were more robust to average-case (naturalistic) perturbations, while networks with higher class selectivity are more vulnerable. In contrast, class selectivity increases robustness to multiple types of worst-case (i.e. white box adversarial) perturbations, suggesting that while decreasing class selectivity is helpful for average-case perturbations, it is harmful for worst-case perturbations. To explain this difference, we studied the dimensionality of the networks representations: we found that the dimensionality of early-layer representations is inversely proportional to a networks class selectivity, and that adversarial samples cause a larger increase in early-layer dimensionality than corrupted samples. Furthermore, the input-unit gradient is more variable across samples and units in high-selectivity networks compared to low-selectivity networks. These results lead to the conclusion that units participate more consistently in low-selectivity regimes compared to high-selectivity regimes, effectively creating a larger attack surface and hence vulnerability to worst-case perturbations.

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