Matches in DBpedia 2015-10 for { ?s ?p "In algebra, the nilradical of a commutative ring is the ideal consisting of the nilpotent elements of the ring.In the non-commutative ring case the same definition does not always work. This has resulted in several radicals generalizing the commutative case in distinct ways. See the article "radical of a ring" for more of this.The nilradical of a Lie algebra is similarly defined for Lie algebras."@en }
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- Nilradical_of_a_ring abstract "In algebra, the nilradical of a commutative ring is the ideal consisting of the nilpotent elements of the ring.In the non-commutative ring case the same definition does not always work. This has resulted in several radicals generalizing the commutative case in distinct ways. See the article "radical of a ring" for more of this.The nilradical of a Lie algebra is similarly defined for Lie algebras.".
- Nilradical_of_a_ring comment "In algebra, the nilradical of a commutative ring is the ideal consisting of the nilpotent elements of the ring.In the non-commutative ring case the same definition does not always work. This has resulted in several radicals generalizing the commutative case in distinct ways. See the article "radical of a ring" for more of this.The nilradical of a Lie algebra is similarly defined for Lie algebras.".