A Unified Characterization of Private Learnability via Graph Theory

Noga Alon, Shay Moran, Hilla Schefler, Amir Yehudayoff

Research output: Contribution to journalConference articlepeer-review

Abstract

We provide a unified framework for characterizing pure and approximate differentially private (DP) learnability. The framework uses the language of graph theory: for a concept class H, we define the contradiction graph G of H. Its vertices are realizable datasets and two datasets S, S are connected by an edge if they contradict each other (i.e., there is a point x that is labeled differently in S and S). Our main finding is that the combinatorial structure of G is deeply related to learning H under DP. Learning H under pure DP is captured by the fractional clique number of G. Learning H under approximate DP is captured by the clique number of G. Consequently, we identify graph-theoretic dimensions that characterize DP learnability: the clique dimension and fractional clique dimension. Along the way, we reveal properties of the contradiction graph which may be of independent interest. We also suggest several open questions and directions for future research.

Original languageEnglish (US)
Pages (from-to)94-129
Number of pages36
JournalProceedings of Machine Learning Research
Volume247
StatePublished - 2024
Event37th Annual Conference on Learning Theory, COLT 2024 - Edmonton, Canada
Duration: Jun 30 2024Jul 3 2024

All Science Journal Classification (ASJC) codes

  • Artificial Intelligence
  • Software
  • Control and Systems Engineering
  • Statistics and Probability

Keywords

  • Chromatic number
  • Clique number
  • Contradiction graph
  • Differential privacy
  • Fractional chromatic number
  • Fractional clique number
  • LP duality
  • PAC learning

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