Independence number of hypergraphs under degree conditions
Abstract
A well-known result of Ajtai et al. from 1982 states that every k-graph H on n vertices, with girth at least five, and average degree tk-1 contains an independent set of size c n ( t)1/(k-1)/t for some c>0. In this paper we show that an independent set of the same size can be found under weaker conditions allowing certain cycles of length 2, 3 and 4. Our work is motivated by a problem of Lo and Zhao, who asked for k 4, how large of an independent set a k-graph H on n vertices necessarily has when its maximum (k-2)-degree k-2(H) dn. (The corresponding problem with respect to (k-1)-degrees was solved by Kostochka, Mubayi, and Varstra\"ete [Random Structures & Algorithms 44, 224--239, 2014].) In this paper we show that every k-graph H on n vertices with k-2(H) dn contains an independent set of size c ( nd nd)1/(k-1), and under additional conditions, an independent set of size c ( nd nd)1/(k-1). The former assertion gives a new upper bound for the (k-2)-degree Tur\'an density of complete k-graphs.
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