Popular Differences for Corners in Abelian Groups

Abstract

For a compact abelian group G, a corner in G × G is a triple of points (x,y), (x,y+d), (x+d,y). The classical corners theorem of Ajtai and Szemer\'edi implies that for every α > 0, there is some δ > 0 such that every subset A ⊂ G × G of density α contains a δ fraction of all corners in G × G, as x,y,d range over G. Recently, Mandache proved a "popular differences" version of this result in the finite field case G = Fpn, showing that for any subset A ⊂ G × G of density α, one can fix d ≠ 0 such that A contains a large fraction, now known to be approximately α4, of all corners with difference d, as x,y vary over G. We generalize Mandache's result to all compact abelian groups G, as well as the case of corners in Z2.