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Commutative rings whose proper ideals decompose intolocal modules
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# |
1403 - 01 |
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Left co-Kothe rings and their characterizations
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10.1080/00927872.2023.2225595 |
1402 - 09 |
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Commutative rings whose proper ideals are pure-semisimple
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10.1080/00927872.2023.2217720 |
1402 - 08 |
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Several characterizations of left K?the rings
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# |
1402 - 04 |
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Erratum to 'Left Co-K?the Rings and Their Characterizations'
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10.1080/00927872.2023.2271983 |
1402 - 01 |
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Direct sum decompositions of projective and injective modules into virtually uniserial modules
|
# |
1401 - 03 |
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Commutative Rings Whose proper Ideals are ?-Virtually Semisimple
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# |
1400 - 11 |
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Virtually homo-uniserial modules and rings
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# |
1400 - 01 |
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Structure of virtually semisimple modules over commutative rings
|
# |
1399 - 04 |
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Virtually uniserial modules and rings
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# |
1399 - 02 |
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Local Rings whose Modules are Almost Serial
|
# |
1398 - 07 |
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Prime Virtually Semisimple Modules and Rings
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# |
1397 - 10 |
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Several generalizations of the Wedderburnn Artin theorem with applications
|
# |
1397 - 09 |
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Virtually semisimple modules and a generalization of the Wedderburn0Artin Theorem
|
# |
1397 - 06 |
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Prime uniserial modules and rings
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# |
1396 - 11 |
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Noetherian Rings whose Modules are Prime Serial
|
# |
1396 - 04 |
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Commutative rings whose proper ideals are direct sums of uniform modules
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# |
1396 - 03 |
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Commutative rings whose proper ideals are serial
|
# |
1396 - 02 |
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Rings all of whose prime serial modules are serial
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# |
1395 - 10 |
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On rings over which every finitely generated module is a direct sum of cyclic modules
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# |
1395 - 07 |