Vertex-minor universality of a random graph
Abstract
Given a graph G and a vertex v∈ V(G), a local complementation at v on G is an operation that replaces the induced graph on the neighborhood of v by its complement. A graph H is a vertex-minor if H can be obtained from G by a sequence of vertex deletions and local complementation. A graph is said to be k-vertex-minor universal if it contains every k-vertex graph on any k-subset of vertices as a vertex minor. Previously, Ascoli--Fredrickson--Fredrickson--McFarland--Post proved that with high probability G(n,1/2) is (n)-vertex-minor universal. Furthermore, they conjectured that with high probability G(n,p) and G(n,1-p) are (pn)-vertex-minor universal for all ω(1/n) p 1/2. In this short note, we confirm this conjecture up to an extra logarithm factor and show that this is true with probability 1-2-(p2n) if ( n/n) p 1/2. Together with a complementary result which applies to the regime where 1/n p n-1/3 produced by an internal model at OpenAI, the conjecture is fully confirmed.
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