On the representation theory of the symmetry group of the Cantor set

Abstract

In previous work with Harman, we introduced a new class of representations for an oligomorphic group G, depending on an auxiliary piece of data called a measure. In this paper, we look at this theory when G is the symmetry group of the Cantor set. We show that G admits exactly two measures μ and . The representation theory of (G, μ) is the linearization of the category of F2-vector spaces, studied in recent work of the author and closely connected to work of Kuhn and Kov\'acs. The representation theory of (G, ) is the linearization of the category of vector spaces over the Boolean semi-ring (or, equivalently, the correspondence category), studied by Bouc--Th\'evenaz. The latter case yields an important counterexample in the general theory.