Degenerate Tur\'an densities of sparse hypergraphs

Abstract

For fixed integers r>k 2,e 3, let fr(n,er-(e-1)k,e) be the maximum number of edges in an r-uniform hypergraph in which the union of any e distinct edges contains at least er-(e-1)k+1 vertices. A classical result of Brown, Erdos and S\'os in 1973 showed that fr(n,er-(e-1)k,e)=(nk). The degenerate Tur\'an density is defined to be the limit (if it exists) π(r,k,e):=n→∞fr(n,er-(e-1)k,e)nk. Extending a recent result of Glock for the special case of r=3,k=2,e=3, we show that π(r,2,3):=n→∞fr(n,3r-4,3)n2=1r2-r-1 for arbitrary fixed r 4. For the more general cases r>k 3, we show that 1rk-rn→∞fr(n,3r-2k,3)nkn→∞fr(n,3r-2k,3)nk 1k!rk-k!2. The main difficulties in proving these results are the constructions establishing the lower bounds. The first construction is recursive and purely combinatorial, and is based on a (carefully designed) approximate induced decomposition of the complete graph, whereas the second construction is algebraic, and is proved by a newly defined matrix property which we call strongly 3-perfect hashing.