English

On the Rigidity of Sparse Random Graphs

Combinatorics 2018-06-25 v1 Discrete Mathematics Probability

Abstract

A graph with a trivial automorphism group is said to be rigid. Wright proved that for lognn+ω(1n)p12\frac{\log n}{n}+\omega(\frac 1n)\leq p\leq \frac 12 a random graph GG(n,p)G\in G(n,p) is rigid whp. It is not hard to see that this lower bound is sharp and for p<(1ϵ)lognnp<\frac{(1-\epsilon)\log n}{n} with positive probability aut(G)\text{aut}(G) is nontrivial. We show that in the sparser case ω(1n)plognn+ω(1n)\omega(\frac 1 n)\leq p\leq \frac{\log n}{n}+\omega(\frac 1n), it holds whp that GG's 22-core is rigid. We conclude that for all pp, a graph in G(n,p)G(n,p) is reconstrutible whp. In addition this yields for ω(1n)p12\omega(\frac 1n)\leq p\leq \frac 12 a canonical labeling algorithm that almost surely runs in polynomial time with o(1)o(1) error rate. This extends the range for which such an algorithm is currently known.

Keywords

Cite

@article{arxiv.1505.01189,
  title  = {On the Rigidity of Sparse Random Graphs},
  author = {Nati Linial and Jonathan Mosheiff},
  journal= {arXiv preprint arXiv:1505.01189},
  year   = {2018}
}

Comments

17 pages

R2 v1 2026-06-22T09:28:45.556Z