English

Multi-fidelity Stability for Graph Representation Learning

Machine Learning 2021-11-29 v1

Abstract

In the problem of structured prediction with graph representation learning (GRL for short), the hypothesis returned by the algorithm maps the set of features in the \emph{receptive field} of the targeted vertex to its label. To understand the learnability of those algorithms, we introduce a weaker form of uniform stability termed \emph{multi-fidelity stability} and give learning guarantees for weakly dependent graphs. We testify that ~\citet{london2016stability}'s claim on the generalization of a single sample holds for GRL when the receptive field is sparse. In addition, we study the stability induced bound for two popular algorithms: \textbf{(1)} Stochastic gradient descent under convex and non-convex landscape. In this example, we provide non-asymptotic bounds that highly depend on the sparsity of the receptive field constructed by the algorithm. \textbf{(2)} The constrained regression problem on a 1-layer linear equivariant GNN. In this example, we present lower bounds for the discrepancy between the two types of stability, which justified the multi-fidelity design.

Keywords

Cite

@article{arxiv.2111.12865,
  title  = {Multi-fidelity Stability for Graph Representation Learning},
  author = {Yihan He and Joan Bruna},
  journal= {arXiv preprint arXiv:2111.12865},
  year   = {2021}
}
R2 v1 2026-06-24T07:51:33.642Z