Some results on modules whose direct complements are almost (essentially) unique.
Derya Keskin Tütüncü and Rachid Tribak
Direct complements in a module $M$ are said to be almost (essentially) unique if, whenever
$M = A \oplus B = A \oplus C$, $(B+C)/B$ is small in $M/B$ ($B \cap C$ is essential in
$B$). The module $M$ is said to be a DCAU-module (DCEU-module) if direct complements of
$M$ are almost (essentially) unique. We determine the structure of both DCAU- and
DCEU-modules over discrete valuation rings. When $R$ is a non-local Dedekind domain, we
describe the structure of the torsion part of a DCAU-$R$-module $M$ (and of a
DCEU-$R$-module $N$) which turns out to be a direct summand of $M$ (of $N$). Moreover, we
investigate the class of rings $R$ for which every right DCAU-$R$-module is DCEU. A ring
of this type will be called a right AE-ring. Analogous to this class of rings, we shed
some light on right EA-rings (i.e., rings $R$ for which every right DCEU-$R$-module is
DCAU). Among other results, we show that every right AE-ring is right Bass and every
commutative EA-ring is perfect. We provide examples to delineate the concepts and results.
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