Vertex Tur\'an problems for the oriented hypercube
Abstract
In this short note we consider the oriented vertex Tur\'an problem in the hypercube: for a fixed oriented graph F, determine the maximum size exv(F, Qn) of a subset U of the vertices of the oriented hypercube Qn such that the induced subgraph Qn[U] does not contain any copy of F. We obtain the exact value of exv(Pk, Qn) for the directed path Pk, the exact value of exv(V2, Qn) for the directed cherry V2 and the asymptotic value of exv(T, Qn) for any directed tree T.
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