K\"othe's Problem, Kurosch-Levitzki Problem and Graded Rings
Abstract
Let R be an associative ring graded by left cancellative monoid S, and e the neutral element of S. We study the following problem: if Re is nil, then is R nil/nilpotent? We have proved that if Re is nil (of bounded index) and f- commutative, then R is nil (of bounded index). Later, we have shown that Re being nilpotent implies R is nilpotent. Consequently, we have exhibited a generalization of Dubnov-Ivanov-Nagata-Higman Theorem for the graded algebras case. Furthermore, we have exhibited relations between graded rings and the problems of K\"othe and Kurosh-Levitzki. We have proved that graded rings and f-commutative rings provide positive solutions to these problems.
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