On a hypergraph Turan problem of Frankl
Abstract
Let C2kr be the 2k-uniform hypergraph obtained by letting P1,...,Pr be pairwise disjoint sets of size k and taking as edges all sets Pi Pj with i ≠ j. This can be thought of as the `k-expansion' of the complete graph Kr: each vertex has been replaced with a set of size k. We determine the exact Turan number of C2k3 and the corresponding extremal hypergraph, thus confirming a conjecture of Frankl. Sidorenko has given an upper bound of (r-2) / (r-1) for the Tur\'an density of C2kr for any r, and a construction establishing a matching lower bound when r is of the form 2p + 1. We show that when r = 2p + 1, any C4r-free hypergraph of density (r-2)/(r-1) - o(1) looks approximately like Sidorenko's construction. On the other hand, when r is not of this form, we show that corresponding constructions do not exist and improve the upper bound on the Tur\'an density of C4r to (r-2)/(r-1) - c(r), where c(r) is a constant depending only on r. The backbone of our arguments is a strategy of first proving approximate structure theorems, and then showing that any imperfections in the structure must lead to a suboptimal configuration. The tools for its realisation draw on extremal graph theory, linear algebra, the Kruskal-Katona theorem and properties of Krawtchouck polynomials.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.