Sums of triples in Abelian groups
Abstract
Motivated by a problem in additive Ramsey theory, we extend Todorcevic's partitions of three-dimensional combinatorial cubes to handle additional three-dimensional objects. As a corollary, we get that if the continuum hypothesis fails, then for every Abelian group G of size 2, there exists a coloring c:G→ Z such that for every uncountable X⊂eq G and every integer k, there are three distinct elements x,y,z of X such that c(x+y+z)=k.
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