Almost all graphs are vertex-minor universal
Abstract
Answering a question of Claudet, we prove that the uniformly random graph is -vertex-minor universal with high probability. That is, for some constant , any graph on any specified vertices of can be obtained as a vertex-minor of . This has direct implications for quantum communications networks: an -vertex -vertex-minor universal graph corresponds to an -qubit -stabilizer universal graph state, which has the property that one can induce any stabilizer state on any qubits using only local operations and classical communications. We further employ our methods in two other contexts. We obtain a bipartite pivot-minor version of our main result, and we use it to derive a universality statement for minors in random binary matroids. We also introduce the vertex-minor Ramsey number to be the smallest value such that every -vertex graph contains an independent set of size as a vertex-minor. Supported by our main result, we conjecture that is polynomial in . We prove .
Keywords
Cite
@article{arxiv.2602.09049,
title = {Almost all graphs are vertex-minor universal},
author = {Ruben Ascoli and Bryce Frederickson and Sarah Frederickson and Caleb McFarland and Logan Post},
journal= {arXiv preprint arXiv:2602.09049},
year = {2026}
}
Comments
33 pages