Non-degenerate Hypergraphs with Exponentially Many Extremal Constructions
Abstract
For every integer , denote by the hypergraph on vertex set with hyperedges . We determine for every and sufficiently large and characterize the extremal -free hypergraphs. In particular, if satisfies certain divisibility conditions, then the extremal -free hypergraphs are exactly the balanced complete tripartite hypergraphs with additional hyperedges inside each of the three parts in the partition; each part spans a -design. This generalizes earlier work of Frankl and F\"uredi on the Tur\'an number of . Our results extend a theory of Erd\H{o}s and Simonovits about the extremal constructions for certain fixed graphs. In particular, the hypergraphs , for , are the first examples of hypergraphs with exponentially many extremal constructions and positive Tur\'an density.
Keywords
Cite
@article{arxiv.2208.00652,
title = {Non-degenerate Hypergraphs with Exponentially Many Extremal Constructions},
author = {József Balogh and Felix Christian Clemen and Haoran Luo},
journal= {arXiv preprint arXiv:2208.00652},
year = {2022}
}