On 2-swelling topological groups
Abstract
A topological group G is called 2-swelling if for any compact subsets A,B⊂ G and elements a,b,c∈ G the inclusions aA bB⊂ A B and aA bB⊂ c(A B) are equivalent to the equalities aA bB=A B and aA bB=c(A B). We prove that an (abelian) topological group G is 2-swelling if each 3-generated (resp. 2-generated) subgroup of G is discrete. This implies that the additive group Q of rationals is 2-swelling and each locally finite topological group is 2-swelling.
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