Private List Learnability vs. Online List Learnability

Abstract

This work explores the connection between differential privacy (DP) and online learning in the context of PAC list learning. In this setting, a k-list learner outputs a list of k potential predictions for an instance x and incurs a loss if the true label of x is not included in the list. A basic result in the multiclass PAC framework with a finite number of labels states that private learnability is equivalent to online learnability [Alon, Livni, Malliaris, and Moran (2019); Bun, Livni, and Moran (2020); Jung, Kim, and Tewari (2020)]. Perhaps surprisingly, we show that this equivalence does not hold in the context of list learning. Specifically, we prove that, unlike in the multiclass setting, a finite k-Littlestone dimensio--a variant of the classical Littlestone dimension that characterizes online k-list learnability--is not a sufficient condition for DP k-list learnability. However, similar to the multiclass case, we prove that it remains a necessary condition. To demonstrate where the equivalence breaks down, we provide an example showing that the class of monotone functions with k+1 labels over N is online k-list learnable, but not DP k-list learnable. This leads us to introduce a new combinatorial dimension, the k-monotone dimension, which serves as a generalization of the threshold dimension. Unlike the multiclass setting, where the Littlestone and threshold dimensions are finite together, for k>1, the k-Littlestone and k-monotone dimensions do not exhibit this relationship. We prove that a finite k-monotone dimension is another necessary condition for DP k-list learnability, alongside finite k-Littlestone dimension. Whether the finiteness of both dimensions implies private k-list learnability remains an open question.