Complementation in the Group of Units of Matrix Rings
Abstract
Let R be a ring with 1 and (R) its Jacobson radical. Then 1+(R) is a normal subgroup of the group of units, G(R). The existence of a complement to this subgroup was explored in a paper by Coleman and Easdown; in particular the ring R=n(pk) was considered. We prove the remaining cases to determine for which n, p and k a complement exists in this ring.
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