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Commutative Rings Whose Maximal Ideals are Direct Sums of Completely Cyclic Modules
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Almost uniserial rings and modules
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Commutative rings whose proper ideals are direct sum of completely cyclic modules
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THE ANNIHILATING-IDEAL GRAPH OF A RING
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A Structure Sheaf on the Spectrum of Prime Radical Modules
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The Spectrum Subgraph of the Annihilating-Ideal Graph of a Commutative Ring
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Local duo-rings whose finitely generated modules are direct sums of cyclics
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#NAME?
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Classification of finite rings Theory and algorithm
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Commutative local rings whose ideals are direct sum of cyclic modules
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On left Kothe rings and a generalization of the Kothe-Cohen-Kaplansky theorem
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m n)-Algebraically Compactness for Modules and m n)-Pure Injectivity
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On FC-purity and I-purity of modules and Kothe rings
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The Classification of the Annihilating-Ideal Graph of a Commutative Ring
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The annihilating-ideal graph of a commutative ring with respect to an ideal
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Uniserial dimension of modules
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Modules whose classical prime submodules are intersections of maximal submodules
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Modules satisfying the prime and maximal radical conditions
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Prime M-Ideals M-Prime submodules M-Prime radical and M-Baer s lower nilradical of modules
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C-pure projective modules
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