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 $\mathrm{St}(\Phi,R)$ for simply laced root systems $\Phi$ of rank $\ge 2$ and arbitrary Dedekind rings of arithmetic type. Also, we prove bounded generation of $\mathrm{St}(\Phi,\mathbb F_{q}[t,\,t{-1}])$ for all root systems $\Phi$, and bounded generation of $\mathrm{St}(\Phi,\mathbb F_{q}[t])$ for all root systems $\Phi\neq\mathsf A_1$. 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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