Bounded generation of Steinberg groups over Dedekind rings of arithmetic type
Abstract
The main result of the present paper is bounded elementary generation of the Steinberg groups St(,R) for simply laced root systems of rank 2 and arbitrary Dedekind rings of arithmetic type. Also, we prove bounded generation of St(, Fq[t,\,t-1]) for all root systems , and bounded generation of St(, Fq[t]) for all root systems ≠ A1. The proofs are based on a theorem on bounded elementary generation for the corresponding Chevalley groups, where we provide uniform bounds.
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