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arxiv: 2004.13407 · v5 · pith:U5HW7UTQnew · submitted 2020-04-28 · 🧮 math.GR · math.LO

Defining R and G(R)

classification 🧮 math.GR math.LO
keywords groupsaxiomatizableclasscorrespondingfinitelyringsrootalgebraic
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We show that for Chevalley groups G(R) of rank at least 2 over a ring R the root subgroups are essentially (nearly always) the double centralizers of corresponding root elements. In very many cases this implies that R and G(R) are bi-interpretable, yielding a new approach to bi-interpretability for algebraic groups over a wide range of rings and fields. For such groups it then follows that the group G(R) is finitely axiomatizable in the appropriate class of groups provided R is finitely axiomatizable in the corresponding class of rings.

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