On the Tur\'an density of \1, 3\-Hypergraphs
Abstract
In this paper, we consider the Tur\'an problems on \1,3\-hypergraphs. We prove that a \1, 3\-hypergraph is degenerate if and only if it's H\1, 3\5-colorable, where H\1, 3\5 is a hypergraph with vertex set V=[5] and edge set E=\\2\, \3\, \1, 2, 4\, \1, 3, 5\, \1, 4, 5\\. Using this result, we further prove that for any finite set R of distinct positive integers, except the case R=\1, 2\, there always exist non-trivial degenerate R-graphs. We also compute the Tur\'an densities of some small \1,3\-hypergraphs.
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