Strong Bounds for Skew-Corner-Free Sets
Abstract
Motivated by applications to matrix multiplication algorithms, Pratt asked (ITCS'24) how large a subset of [n] × [n] could be without containing a skew-corner: three points (x,y), (x,y+h),(x+h,y') with h 0. We prove any skew corner-free set has size at most (-(1/12 n))· n2, nearly matching the best known lower bound of (-O( n))· n2 by Beker (arXiv'24). Our techniques generalize those of Kelley and Meka's recent breakthrough on three-term arithmetic progression (FOCS'23), answering a question of Beker (arXiv'24). We note that a similar bound was obtained concurrently and independently by Mili\'cevi\'c (arXiv'24).
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