Abstract
In this paper, the s.Baer module concept and some of its generalizations (e.g. quasi-s.Baer, [Formula: see text]-s.Baer and p.q.-s.Baer) are developed. To this end, we characterize the class of rings for which every module is quasi-s.Baer as the class of rings which are finite direct sums of simple rings. Connections are made between the s.Baer (quasi-s.Baer, [Formula: see text]-s.Baer) and the extending (FI-extending, [Formula: see text]-extending) properties. We introduce the notions of quasi-nonsingularity (FI-s.nonsingular, [Formula: see text]-s.nonsingular) and [Formula: see text]-cononsingular (FI-[Formula: see text]-cononsingular, [Formula: see text]-[Formula: see text]-cononsingular) to extend the Chatters–Khuri theorem from rings to modules satisfying s.Baer or related conditions. Moreover, we investigate the transfer of various Baer properties between a module and its ring of scalars. Conditions are found for which some classes of quasi-s.Baer modules coincide with some classes of p.q.-s.Baer modules. Further we show that the class of quasi-s.Baer (p.q.-s.Baer) modules is closed with respect to submodules, extensions, and finite (arbitrary) direct sums. Examples illustrate and delimit our results.
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