Abstract
We prove that for every graph H, there exists ε>0 such that every n-vertex graph with no vertex-minors isomorphic to H has a pair of disjoint sets A, B of vertices such that |A|,|B|≥εn and A is complete or anticomplete to B. We deduce this from recent work of Chudnovsky, Scott, Seymour, and Spirkl (2018). This proves the analog of the Erdős–Hajnal conjecture for vertex-minors.
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