On normal subgroups of D* whose elements are periodic modulo the center of D of bounded order
Abstract
Let D be a division ring with the center F=Z(D). Suppose that N is a normal subgroup of D* which is radical over F, that is, for any element x∈ N, there exists a positive integer nx, such that xnx∈ F. In Her1, Herstein conjectured that N is contained in F. In this paper, we show that the conjecture is true if there exists a positive integer d such that nx d for any x∈ N
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