Excluding pairs of tournaments

Abstract: The Erdős–Hajnal conjecture states that for every given undirected graph H there exists a constant c(H)>0 such that every graph G that does not contain H as an induced subgraph contains a clique or a stable set of size at least false|V(G)false|cfalse(Hfalse). The conjecture is still open. Its equivalent directed version states that for every given tournament H there exists a constant c(H)>0 such that every H‐free tournament T contains a transitive subtournament of order at least false|V(T)false|cfalse(Hfalse).… Show more

“…The question of excluding pairs of graphs in the context of the Erdős-Hajnal conjecture was considered also in the directed setting (see: [9]). The directed version of the conjecture is equivalent to the undirected one and was recently heavily investigated ( [3,11,13,10,12]).…”

Excluding Hooks and their Complements

“…The question of excluding pairs of graphs in the context of the Erdős-Hajnal conjecture was considered also in the directed setting (see: [9]). The directed version of the conjecture is equivalent to the undirected one and was recently heavily investigated ( [3,11,13,10,12]).…”

Excluding Hooks and their Complements

Forbidding Couples of Tournaments and the Erdös–Hajnal Conjecture

Forests and the strong Erdős-Hajnal property