Abstract
Two possible ways of extending the Brown-McCoy radical to non-0-symmetric near-rings are discussed. If a Kurosh-Amitsur semisimple class So in the class No of 0-symmetric near-rings satisfies a certain condition on local units, then So is a Kurosh-Amitsur semisimple class also in the class N of all near-rings. So the subdirect closure of the class of simple 0-symmetric near-rings with identity is a Kurosh-Amitsur semisimple class in N with non-hereditary radical class. The Hoehnke radical eE determined by the class of simple near-rings with identity is not idempotent, though for every N ε N the radical eE (N) is the unique largest G-regular ideal of N. In both cases the radical classes are hereditary with respect to invariant ideals.
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