Self-Injective Rings

E.T. Wong; R.E. Johnson

doi:10.4153/CMB-1959-022-9

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Historically, the first example of a ring of quotients was the quotient field of an integral domain. Later on, conditions were found under which a noncommutative integral domain has a quotient division ring. More recently, R.E. Johnson [4], Y. Utumi [5], and G.D. Findlay and J. Lambek [3] have discussed the existence and structure of a maximal ring of quotients of any ring.

The present paper uses the methods of Findlay and Lambek to recast the results of Johnson on the quotient ring of a ring with zero singular ideal. It is also shown that such a ring has a unique left-right maximal ring of quotients.

References

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3. Findlay, G.D. and Lambek, J., A generalized ring of quotients I, H, Can. Math. Bull. 1 (1958), 77-85, 155-167.Google Scholar

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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