Paths in hypergraphs: a rescaling phenomenon
Abstract
Let Pk denote the loose k-path of length and let define fk(n,m) as the minimum value of (H) over all Pk-free k-graphs H with n vertices and m edges. In the paper we study the behavior of f42(n,m) and f33(n,m) and characterize the structure of extremal hypergraphs. In particular, it is shown that when m n2/8 the value of each of these functions drops down from (n2) to (n).
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