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http://dx.doi.org/10.4134/JKMS.j180277

RINGS IN WHICH SUMS OF d-IDEALS ARE d-IDEALS  

Dube, Themba (Department of Mathematics Sciences University of South Africa)
Publication Information
Journal of the Korean Mathematical Society / v.56, no.2, 2019 , pp. 539-558 More about this Journal
Abstract
An ideal of a commutative ring is called a d-ideal if it contains the annihilator of the annihilator of each of its elements. Denote by DId(A) the lattice of d-ideals of a ring A. We prove that, as in the case of f-rings, DId(A) is an algebraic frame. Call a ring homomorphism "compatible" if it maps equally annihilated elements in its domain to equally annihilated elements in the codomain. Denote by $SdRng_c$ the category whose objects are rings in which the sum of two d-ideals is a d-ideal, and whose morphisms are compatible ring homomorphisms. We show that $DId:\;SdRng_c{\rightarrow}CohFrm$ is a functor (CohFrm is the category of coherent frames with coherent maps), and we construct a natural transformation $RId{\rightarrow}DId$, in a most natural way, where RId is the functor that sends a ring to its frame of radical ideals. We prove that a ring A is a Baer ring if and only if it belongs to the category $SdRng_c$ and DId(A) is isomorphic to the frame of ideals of the Boolean algebra of idempotents of A. We end by showing that the category $SdRng_c$ has finite products.
Keywords
Baer ring; reduced ring; d-ideal; sum of d-ideals; ${\zeta}$-ideal; algebraic frame; d-nucleus; functor;
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