Preorder induced by rainbow forbidden subgraphs
Abstract
A subgraph H of an edge-colored graph G is rainbow if all the edges of H receive different colors. If G does not contain a rainbow subgraph isomorphic to H, we say that G is rainbow H-free. For connected graphs H1 and H2, if every rainbow H1-free edge-colored complete graph colored in sufficiently many colors is rainbow H2-free, we write H1 H2. The binary relation is reflexive and transitive, and hence it is a preorder. If H1 is a subgraph of H2, then trivially H1 H2 holds. On the other hand, there exists a pair (H1, H2) such that H1 is a proper supergraph of H2 and H1 H2 holds. Cui et al.~[Discrete Math.~344 (2021) Article Number 112267] characterized these pairs. In this paper, we investigate the pairs (H1, H2) with H1 H2 when neither H1 nor H2 is a subgraph of the other. We prove that there are many such pairs and investigate their structure with respect to .
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