A note on the t-partite link problem of F\"uredi

Abstract

Motivated by the Erdos--S\'os bipartite link conjecture, F\"uredi (Oberwolfach, 2004) asked for the asymptotic maximum edge density πlink(t) of 3-graphs in which the link graph of every vertex is t-partite. Goldwasser's recursive blow-up construction based on projective planes gives the lower bound πlink(t) 1-t-1-(2+ot(1))t-2 whenever t-1 is a prime power. In this note, we prove the upper bound πlink(t) 1-t-1-t-2/12 for every t 2. Together with Goldwasser's construction, this determines, up to a constant factor, the correct order of the gap between πlink(t) and the trivial averaging upper bound 1-t-1 for all prime-power values of t-1. In fact, our argument applies in the more general setting of 3-graphs with no generalized daisies, equivalently, 3-graphs in which the link graph of every vertex is Kt+1-free. We also establish an analogous upper bound for the positive (r-1)-codegree Tur\'an density of generalized daisies.