Quasipolynomial bounds for the corners theorem

Abstract

Let G be a finite abelian group and A be a subset of G × G which is corner--free, meaning that there are no x, y ∈ G and d ∈ G \0\ such that (x, y), (x+d, y), (x, y+d) ∈ A. We prove that \[|A| |G|2 · (-( |G|)(1)).\] As a consequence, we obtain polynomial (in the input length) lower bounds on the nondeterministic communication complexity of Exactly-N in the 3-player Number-on-Forehead model. We also obtain the first "reasonable'' lower bounds on the coloring version of the 3-dimensional corners problem, as well as on the nondeterministic communication complexity of Exactly-N in the 4-player Number-on-Forehead model.

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