Tur\'an Numbers of Ordered Tight Hyperpaths
Abstract
An ordered hypergraph is a hypergraph G whose vertex set V(G) is linearly ordered. We find the Tur\'an numbers for the r-uniform s-vertex tight path P(r)s (with vertices in the natural order) exactly when r s < 2r and n is even; our results imply ex>(n,P(r)s)=(1-12s-r + o(1))nr when r s<2r. When r 2s, the asymptotics of ex>(n,P(r)s) remain open. For r=3, we give a construction of an r-uniform n-vertex hypergraph not containing P(r)s which we conjecture to be asymptotically extremal.
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