English

Graph Matrices: Norm Bounds and Applications

Combinatorics 2021-04-30 v5

Abstract

In this paper, we derive nearly tight probabilistic norm bounds for a class of random matrices we call graph matrices. While the classical case of symmetric matrices with independent random entries (Wigner's matrices) is a special case, in general, the entries of our matrices will be dependent in a way that can be specified in terms of a fixed-size graph we refer to as the shape. For Wigner's matrices, this shape is K2K_2, the clique on 2 vertices. To prove our norm bounds, we use the trace power method. In a recent series of papers by Potechin and coauthors, graph matrices played a crucial role in proving average-case lower bounds for the Sum-of-Squares (SoS) hierarchy of proof systems, one of the most powerful, but difficult to analyze, techniques in combinatorial optimization. In particular, graph matrices played a crucial role in proving that low-degree SoS cannot refute the existence of a large clique in a random graph and proving that low-degree SoS cannot prove a tight lower bound on the ground state energy of the Sherrington-Kirkpatrick Hamiltonian. In this paper, we give several additional applications of graph matrices. We show that for several technical lemmas in the literature, while the original analyses were quite involved, we can give direct proofs using graph matrices and our norm bounds.

Keywords

Cite

@article{arxiv.1604.03423,
  title  = {Graph Matrices: Norm Bounds and Applications},
  author = {Kwangjun Ahn and Dhruv Medarametla and Aaron Potechin},
  journal= {arXiv preprint arXiv:1604.03423},
  year   = {2021}
}

Comments

This paper is a major update of the paper "Bounds on the Norms of Uniform Low Degree Graph Matrices". The norm bounds can now handle hyperedges, different types of vertices, and different input distributions. Also, an application section has been added which describes how to apply graph matrices and gives examples of several technical statements whose proof can be simplified using graph matrices

R2 v1 2026-06-22T13:30:29.311Z