Strong non-principality of positive codegree Turán density

Abstract

The minimum positive codegree δ+k-1(G) of a k-graph G is the minimum, over all (k-1)-sets that lie in at least one edge, of the number of edges containing that set. The positive codegree Turán density of a k-graph family F is the asymptotically maximum value of δ+k-1(G)/n over all F-free k-graphs G with n∞ vertices. In this note, we establish a strong version of non-principality with respect to this density by proving that for every k3 there exist two k-graphs F1 and F2 such that 0<γ+(F1, F2) < \γ+(F1), γ+(F2)\.