On asymorphisms of groups

Abstract

Let G, H be groups and be a cardinal. A bijection f:G H is caled on asymorphism if, for any X∈[G]<, Y∈[H]<, there exist X'∈[G]<, Y'∈[H]< such that for all x∈ G and y∈ H, we have f(Xx)⊂eq Y'f(x), f-1(Yy)⊂eq X'f-1(y). For a set S, [S]< denotes the set \S'⊂eq S: |S'|<\. Let and γ be cardinals such that 0<γ. We prove that any two Abelian groups of cardinality γ are -asymorphic, but the free group of rank γ is not -asymorphic to an Abelian group provided that either <γ or =γ and is a singular cardinal. It is known [7] that if γ = and is regular then any two groups of cardinality are -asymorphic.