Browsing by Author "Durgun, Y"
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Item ON SUBFLAT DOMAINS OF RD-FLAT MODULESBozkurt, M; Durgun, YThe concept of subflat domain is used to measure how close (or far away) a module is to be flat. A right module is flat if its subflat domain is the entire class of left modules. In this note, we focus on of RD-flat modules that have subflat domain which is exactly the collection of all torsion-free modules, shortly tf-test modules. Properties of subflat domains and of tf-test modules are studied. New characterizations of left P-coherent rings and torsion-free rings by subflat domains of cyclically presented left R-modules are obtained.Item Rings whose RD-flat modules have restricted subflat domainsDurgun, Y; Bozkurt, MA module K-R is said to be L-R-subflat if for every short exact sequence 0 ? U? D? L? 0 of left R-modules, the sequence 0 ? K? U? K? D? K? L? 0 is exact. The subflat domains of (RD-flat) modules somehow tells us how far (or how close) such a module is from being flat. Every right R-module is subflat relative to all flat left R-modules, and flat modules are the only ones sharing the distinction of being in every single subflat domain. A module is called f-test if it is subflat only to flat modules. Similarly, an RD-flat module is called tf-test if it is subflat only to torsion-free modules. In this paper, we consider two families of rings characterized by their RD-flat modules: those whose finitely presented RD-flat modules are either flat or tf-test (property (P)) and those whose finitely presented RD-flat modules are either torsion-free (flat) or f-test (property (Q)). Structural properties of both classes of rings are studied.