Proves linear max-information bound for DP-SGD and derives explicit PAC-Bayes generalization bounds with learnable prior and hyperparameter-controlled complexity term.
Generalization of Gibbs and Langevin Monte Carlo Algorithms in the Interpolation Regime
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
This paper provides data-dependent bounds on the expected error of the Gibbs algorithm in the overparameterized interpolation regime, where low training errors are also obtained for impossible data, such as random labels in classification. The results show that generalization in the low-temperature regime is already signaled by small training errors in the noisier high-temperature regime. The bounds are stable under approximation with Langevin Monte Carlo algorithms. The analysis motivates the design of an algorithm to compute bounds, which on the MNIST, CIFAR-10, and SVHN datasets yield nontrivial, close predictions on the test error for true labeled data, while maintaining a correct upper bound on the test error for random labels.
fields
cs.LG 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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From Privacy to Generalization: Linear Max-Information Bounds for DP-SGD
Proves linear max-information bound for DP-SGD and derives explicit PAC-Bayes generalization bounds with learnable prior and hyperparameter-controlled complexity term.