Triforce and Corners

Abstract

May the triforce be the 3-uniform hypergraph on six vertices with edges \123',12'3,1'23\. We show that the minimum triforce density in a 3-uniform hypergraph of edge density δ is δ4-o(1) but not O(δ4). Let M(δ) be the maximum number such that the following holds: for every ε > 0 and G = F2n with n sufficiently large, if A ⊂eq G × G with A δ|G|2, then there exists a nonzero "popular difference" d ∈ G such that the number of "corners" (x,y), (x+d,y), (x,y+d) ∈ A is at least (M(δ) - ε)|G|2. As a corollary via a recent result of Mandache, we conclude that M(δ) = δ4-o(1) and M(δ) = ω(δ4). On the other hand, for 0 < δ < 1/2 and sufficiently large N, there exists A ⊂eq [N]3 with |A|δ N3 such that for every d 0, the number of corners (x,y,z), (x+d,y,z),(x,y+d,z),(x,y,z+d) ∈ A is at most δc (1/δ) N3. A similar bound holds in higher dimensions, or for any configuration with at least 5 points or affine dimension at least 3.