Thin Subsets of Groups
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 |F g ∩ A| ≤ m for all g ∈ G \ K: We show that each m-thin subset of an Abelian group G of cardinality ℵ n ; n = 0, 1,… can be split into ≤ m n+1 1-thin subsets. On the other hand, we construct a group G of cardinality ℵ ω and select a 2-thin subset of G which cannot be split into finitely many 1-thin subsets.
English version (Springer): Ukrainian Mathematical Journal 65 (2013), no. 9, pp 1384-1393.
Citation Example: Protasov I. V., Slobodianiuk S. V. Thin Subsets of Groups // Ukr. Mat. Zh. - 2013. - 65, № 9. - pp. 1245–1253.