On the codegree Turán density of projective geometries
Abstract
Let F be a k-uniform hypergraph, abbreviated as k-graph. The codegree Turán density γ(F) is the supremum over all γ∈ [0,1) such that, for arbitrarily large n, there exists an n-vertex F-free k-graph H whose every (k-1)-subset of vertices lies in at least γn edges. Let PGm(q) be the projective geometry of dimension m over finite field Fq. In this paper, we prove that γ(PGm(q)) 1p> 0 for all m and q, where p is the smallest prime divisor of q+1. This resolves an open problem proposed by Keevash and Zhao (JCT-B, 2007). Moreover, we determine the exact codegree Turán density of PG4(q) when q is an odd prime power.
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