Abstract
Let $P^k_\ell$ denote the loose $k$-path of length $\ell$ and let $f^k_\ell(n,m)$ be the minimum value of $\Delta(H)$ over all $P^k_\ell$-free $k$-graphs $H$ with $n$ vertices and $m$ edges. In this paper we study the behavior of $f^4_2(n,m)$ and $f^3_3(n,m)$ and characterize the structure of extremal hypergraphs. In particular, it is shown that when $m\sim n^2/8$ the value of each of these functions drops down from $\Theta(n^2)$ to $\Theta(n)$.
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