On the Ring of Quotients of a Boolean Ring

B. Brainerd; J. Lambek

doi:10.4153/CMB-1959-006-x

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

Two important mathematical constructions are: the construction of the rational s from the integers and the construction of the reals from the rationals. The first process can be carried out for any ring, producing its maximal ring of quotients [4, 5]. The second process can be carried out for any partially ordered set producing its Dedekind-MacNeille completion [2, p. 58]. We will show that for Boolean rings, which are both rings and partially ordered sets, the two constructions coincide.

References

1. Banaschewski, B., Hüllensysteme and Erweiterung von Quasiordnungen, Zeitschr. f. math. Logik and Grundlag?n d. Math. 2(1956), 117-130.Google Scholar

2. Birkhoff, G., Lattice theory, (New York, 1948).Google Scholar

3. Cartan, H. and Eilenberg, S., Homological algebra, (Princeton, 1956).Google Scholar

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

5. Utumi, Y., On quotient rings, Osaka Math. J. 8(1956), 1-18.Google Scholar

Crossref Citations

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

Utumi, Yuzo 1960. On Continuous Regular Rings and Semisimple Self Injective Rings. Canadian Journal of Mathematics, Vol. 12, Issue. , p. 597.

Lambek, Joachim 1961. On the Structure of Semi-Prime Rings and their Rings of Quotients. Canadian Journal of Mathematics, Vol. 13, Issue. , p. 392.

Banaschewski, Bernhard 1965. Maximal rings of quotients of semi-simple commutative rings. Archiv der Mathematik, Vol. 16, Issue. 1, p. 414.

Roos, Jan-Erik 1967. Reports of the Midwest Category Seminar. Vol. 47, Issue. , p. 156.

Jensen, C.U. 1969. Some cardinality questions for flat modules and coherence. Journal of Algebra, Vol. 12, Issue. 2, p. 231.

Elizarov, V. P. 1969. Quotient rings. Algebra and Logic, Vol. 8, Issue. 4, p. 219.

Berthiaume, Pierre 1971. Generalized semigroups of quotients. Glasgow Mathematical Journal, Vol. 12, Issue. 2, p. 150.

Schmid, Jürg 1974. Completing Boolean Algebras by Nonstandard Methods. Mathematical Logic Quarterly, Vol. 20, Issue. 1-3, p. 47.

González, Santos 1989. The complete ring of quotients of a reduced alternative ring. orthogonal completion. Communications in Algebra, Vol. 17, Issue. 8, p. 2017.

Dauns, John 1989. Torsion free modules. Annali di Matematica Pura ed Applicata, Vol. 154, Issue. 1, p. 49.

Thurnherr, W. and Schmid, J. 1995. Maximal (semi-)lattices of fractions and injective hulls. Semigroup Forum, Vol. 51, Issue. 1, p. 105.

Pérez, Jaime Castro Raggi, Francisco Montes, José Ríos and Berg, John van den 2005. On the Atomic Dimension in Module Categories. Communications in Algebra, Vol. 33, Issue. 12, p. 4679.

LAGRANGE, JOHN D. 2009. RATIONALLY ℵα-COMPLETE COMMUTATIVE RINGS OF QUOTIENTS. Journal of Algebra and Its Applications, Vol. 08, Issue. 05, p. 601.

Choban, Mitrofan M. and Ursul, Mihail I. 2010. Advances in Ring Theory. p. 85.

Pérez, Jaime Castro Montes, José Ríos and Sánchez, Gustavo Tapia 2023. Some aspects about the lattice [τ g ,χ] and the torsion theories of Kaplansky-type . Communications in Algebra, Vol. 51, Issue. 10, p. 4234.

Article contents

On the Ring of Quotients of a Boolean Ring

Extract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests