Factors in infinite groups

Abstract

Let G be a group and A⊂eq G a non-empty subset. A right s-factor associated with A is a maximal subset U⊂eq G such that the product AU is direct. The lower and upper s-indices |G:A|- and |G:A|+ are defined as the minimum and the supremum of the cardinalities of such maximal sets U. The subset A is called stable if |G:A|- = |G:A|+, and G is called stable if every subset of G is stable. Using a graph-theoretic reformulation in terms of Cayley graphs, we prove that every infinite group is unstable. Equivalently, for every infinite group G there exists a subset A⊂eq G for which maximal subsets U with direct product AU do not all have the same cardinality. This gives a negative answer to Question 21.58 of the Kourovka Notebook.