Learning on Random Balls is Sufficient for Estimating (Some) Graph Parameters
Abstract
Theoretical analyses for graph learning methods often assume a complete observation of the input graph. Such an assumption might not be useful for handling any-size graphs due to the scalability issues in practice. In this work, we develop a theoretical framework for graph classification problems in the partial observation setting (i.e., subgraph samplings). Equipped with insights from graph limit theory, we propose a new graph classification model that works on a randomly sampled subgraph and a novel topology to characterize the representability of the model. Our theoretical framework contributes a theoretical validation of mini-batch learning on graphs and leads to new learning-theoretic results on generalization bounds as well as size-generalizability without assumptions on the input.
Cite
@article{arxiv.2111.03317,
title = {Learning on Random Balls is Sufficient for Estimating (Some) Graph Parameters},
author = {Takanori Maehara and Hoang NT},
journal= {arXiv preprint arXiv:2111.03317},
year = {2021}
}
Comments
The manuscript is accepted as a poster presentation at NeurIPS 2021. This ArXiv version includes the Appendix