Thin subsets of groups
Abstract
For a group G and a natural number m, a subset A of G is called m-thin if, for each finite subset F of G, there exists a finite subset K of G such that |Fg A|≤slant m for every g∈ G K. We show that each m-thin subset of a group G of cardinality n, n= 0,1,... can be partitioned into ≤slant mn+1 1-thin subsets. On the other side, we construct a group G of cardinality ω and point out a 2-thin subset of G which cannot be finitely partitioned into 1-thin subsets.
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