Baer, Quasi-Baer Modules, and Their Applications
Gary F. Birkenmeier,
Jae Keol Park and
S. Tariq Rizvi
Additional contact information
Gary F. Birkenmeier: University of Louisiana at Lafayette, Department of Mathematics
Jae Keol Park: Busan National University, Department of Mathematics
S. Tariq Rizvi: The Ohio State University at Lima, Department of Mathematics
Chapter Chapter 4 in Extensions of Rings and Modules, 2013, pp 93-137 from Springer
Abstract:
Abstract The Baer and the quasi-Baer properties of rings are extended to a module theoretic setting in this chapter. Using the endomorphism ring of a module, the notions of Baer, quasi-Baer, and Rickart modules are introduced and studied. Similar to the fact that every Baer ring is nonsingular, we shall see that every Baer module satisfies a weaker notion of nonsingularity of modules ( $\mathcal{K}$ -nonsingularity) which depends on the endomorphism ring of the module. Strong connections between a Baer module and an extending module will be observed via this weak nonsingularity and its dual notion. It is shown that an extending module which is $\mathcal{K}$ -nonsingular is precisely a $\mathcal{K}$ -cononsingular Baer module. This provides a module theoretic analogue of the Chatters-Khuri theorem for rings. Direct summands of Baer and quasi-Baer modules respectively inherit these properties. This provides a rich source of examples of Baer and quasi-Baer modules, since one can readily see that for any (quasi-)Baer ring R and an idempotent e in R, the right R-module eR R is always a (quasi-)Baer module. It will be seen that every projective module over a quasi-Baer ring is a quasi-Baer module. Connections of a (quasi-)Baer module and its endomorphism ring are discussed. Characterizations of classes of rings via the Baer property of certain classes of free modules over them are presented. An application also yields a type theory for $\mathcal{K}$ -nonsingular extending (continuous) modules which, in particular, improve the type theory for nonsingular injective modules provided by Goodearl and Boyle. Similar to the case of Baer modules, close links between quasi-Baer modules and FI-extending modules are established via a characterization connecting the two notions. The concepts of FI- $\mathcal{K}$ -nonsingularity and FI- $\mathcal{K}$ -cononsingularity are introduced and utilized to obtain this characterization. Analogous to right Rickart rings, the notion of Rickart modules is introduced as another application of the theory of Baer modules in the last section of the chapter. Connections of Rickart modules to their endomorphism rings are shown. A direct sum of Rickart modules is not Rickart in general. The closure of the class of Rickart modules with respect to direct sums is discussed among other recent results on this notion.
Keywords: Baer module; $\mathcal{K}$ -nonsingular; $\mathcal{K}$ -cononsingular; SIP; SSIP; Hopfian; $\mathcal{K}$ -singular submodule; Retractable; Quasi-retractable; Right coherent; Torsionless; C*-module; Right n-hereditary; n fir; IBN; Right Π-coherent; Abelian module; Types I; I f; I∞; II; II f; II∞ and III; Rickart module; (D2) condition; Quasi-Baer module; FI- $\mathcal{K}$ -nonsingular (search for similar items in EconPapers)
Date: 2013
References: Add references at CitEc
Citations:
There are no downloads for this item, see the EconPapers FAQ for hints about obtaining it.
Related works:
This item may be available elsewhere in EconPapers: Search for items with the same title.
Export reference: BibTeX
RIS (EndNote, ProCite, RefMan)
HTML/Text
Persistent link: https://EconPapers.repec.org/RePEc:spr:sprchp:978-0-387-92716-9_4
Ordering information: This item can be ordered from
http://www.springer.com/9780387927169
DOI: 10.1007/978-0-387-92716-9_4
Access Statistics for this chapter
More chapters in Springer Books from Springer
Bibliographic data for series maintained by Sonal Shukla () and Springer Nature Abstracting and Indexing ().