Semigroup approach to admissible representations of the infinite symmetric group

Abstract

Let S(∞) denote the group of finitary permutations of the set N:=\1,2,3,…\. It is a countable group admitting a lot of different topologies compatible with the group structure. In particular, such topologies arise from partitions of the set N into blocks of infinite size. The corresponding categories of continuous unitary representations of S(∞) were studied by Nessonov (Sbornik: Mathematics, 2012). We propose a different approach to his classification results based on the so-called semigroup method. Some additional information is also obtained.

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