Corners over quasirandom groups
Abstract
Let G be a finite D-quasirandom group and A ⊂ Gk a δ-dense subset. Then the density of the set of side lengths g of corners \[ \(a1,…,ak),(ga1,a2,…,ak),…,(ga1,…,gak)\ ⊂ A \] converges to 1 as D∞.
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