Robust Graph Isomorphism, Quadratic Assignment and VC Dimension
Abstract
We present an additive -approximation algorithm for the Graph Edit Distance problem (GED) on graphs of VC dimension running in time . In particular, this recovers a previous result by Arora, Frieze, and Kaplan [Math. Program. 2002] who gave an -approximation running in time . Similar to the work of Arora et al., we extend our results to arbitrary Quadratic Assignment problems (QAPs) by introducing a notion of VC dimension for QAP instances, and giving an -approximation for QAPs with bounded weights running in time . As a particularly interesting special case, we further study the problem -, which entails determining if two graphs over vertices are isomorphic, when promised that if they are not, their graph edit distance is at least . We show that the standard Weisfeiler--Leman algorithm of dimension solves this problem on graphs of VC dimension . We also show that dimension suffices on arbitrary -vertex graphs, while -WL fails on instances at distance .
Cite
@article{arxiv.2604.12584,
title = {Robust Graph Isomorphism, Quadratic Assignment and VC Dimension},
author = {Anatole Dahan and Martin Grohe and Daniel Neuen and Tomáš Novotný},
journal= {arXiv preprint arXiv:2604.12584},
year = {2026}
}
Comments
23 pages