Monochrome Symmetric Subsets in 2-Colorings of Groups

Yuliya Gryshko

Abstract


A subset $A$ of a group $G$ is called symmetric with respect to the element $g\in G$ if $A=gA^{-1}g$. It is proved that in any 2-coloring, every infinite group $G$ contains monochrome symmetric subsets of arbitrarily large cardinality $ < |G|$.


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