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arxiv: 1907.13204 · v3 · pith:5W2N37WP · submitted 2019-07-30 · math.GR · math.CO· math.LO

Simplicity of the automorphism groups of generalised metric spaces

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classification math.GR math.COmath.LO
keywords automorphismgroupaxiomsextrahomogeneousprovesimplesimplicity
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Tent and Ziegler proved that the automorphism group of the Urysohn sphere is simple and that the automorphism group of the Urysohn space is simple modulo bounded automorphisms. A key component of their proof is the definition of a stationary independence relation (SIR). In this paper we prove that the existence of a SIR satisfying some extra axioms is enough to prove simplicity of the automorphism group of a countable structure. The extra axioms are chosen with applications in mind, namely homogeneous structures which admit a "metric-like amalgamation", for example all primitive 3-constrained metrically homogeneous graphs of finite diameter from Cherlin's list.

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