Amenability of semigroups and common multiples in 1+
Abstract
In this note, we prove that a semigroup S is left amenable if and only if every two nonzero elements of 1+(S) have a common nonzero right multiple, where 1+(S) is the positive part of the Banach algebra 1(S), or equivalently the semiring of finite measures on S. This characterization of amenability is new even for groups.
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