Inducibility of rainbow graphs

Abstract

Fix k 11 and a rainbow k-clique R. We prove that the inducibility of R is k!/(kk-k). An extremal construction is a balanced recursive blow-up of R. This answers a question posed by Huang, that is a generalization of an old problem of Erd os and S\'os. It remains open to determine the minimum k for which our result is true. More generally, we prove that there is an absolute constant C>0 such that every k-vertex connected rainbow graph with minimum degree at least C k has inducibility k!/(kk-k).

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