On generalized corners and matrix multiplication

Abstract

Suppose that S ⊂eq [n]2 contains no three points of the form (x,y), (x,y+δ), (x+δ,y'), where δ ≠ 0. How big can S be? Trivially, n |S| n2. Slight improvements on these bounds are obtained from Shkredov's upper bound for the corners problem [Shk06], which shows that |S| O(n2/( n)c) for some small c > 0, and a construction due to Petrov [Pet23], which shows that |S| (n n/ n). Could it be that for all > 0, |S| O(n1+)? We show that if so, this would rule out obtaining ω = 2 using a large family of abelian groups in the group-theoretic framework of Cohn, Kleinberg, Szegedy and Umans [CU03,CKSU05] (which is known to capture the best bounds on ω to date), for which no barriers are currently known. Furthermore, an upper bound of O(n4/3 - ) for any fixed > 0 would rule out a conjectured approach to obtain ω = 2 of [CKSU05]. Along the way, we encounter several problems that have much stronger constraints and that would already have these implications.