Root graded groups revisited
Abstract: A group $G$ is called root graded if it has a family of subgroups $G_\alpha$ indexed by roots from a root system $\Phi$ satisfying natural conditions similar to Chevalley groups over commutative unital rings. For any such group there is a corresponding algebraic structure (commutative unital ring, associative unital ring, etc.) encoding the commutator relations between $G_\alpha$. We give a complete description of varieties of such structures for irreducible root systems of rank $\geq 3$ excluding $\mathsf H_3$ and $\mathsf H_4$. Moreover, we provide a construction of root graded groups for all algebraic structures from these varieties.
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