Groups with A-commutator relations
Abstract
If A is a unital associative ring and ≥ 2, then the general linear group GL(, A) has root subgroups Uα and Weyl elements nα for α from the root system of type A - 1. Conversely, if an arbitrary group has such root subgroups and Weyl elements for ≥ 4 satisfying natural conditions, then there is a way to recover the ring A. We prove a generalization of this result not using the Weyl elements, so instead of the matrix ring M(, A) we construct a non-unital associative ring with a well-behaved Peirce decomposition.
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