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• Serial_module abstract "In abstract algebra, a uniserial module M is a module over a ring R, whose submodules are totally ordered by inclusion. This means simply that for any two submodules N1 and N2 of M, either or . A module is called a serial module if it is a direct sum of uniserial modules. A ring R is called a right uniserial ring if it is uniserial as a right module over itself, and likewise called a right serial ring if it is a right serial module over itself. Left uniserial and left serial rings are defined in an analogous way, and are in general distinct from their right counterparts. An easy motivational example is the quotient ring for any integer . This ring is always serial, and is uniserial when n is a prime power.The term uniserial has been used differently from the above definition: for clarification see this section.A partial alphabetical list of important contributors to the theory of serial rings includes the mathematicians Keizo Asano, I. S. Cohen, P.M. Cohn, Yu. Drozd, D. Eisenbud, A. Facchini, A.W. Goldie, Phillip Griffith, I. Kaplansky, V.V Kirichenko, G. Köthe, H. Kuppisch, I. Murase, T. Nakayama, P. Příhoda, G. Puninski, and R. Warfield. References for each author can be found in (Puninski 2001) and (Hazewinkel 2004).Following the common ring theoretic convention, if a left/right dependent condition is given without mention of a side (for example, uniserial, serial, Artinian, Noetherian) then it is assumed the condition holds on both the left and right. Unless otherwise specified, each ring in this article is a ring with unity, and each module is unital.".
• Serial_module wikiPageExternalLink ?id=PswhrD_wUIkC.
• Serial_module wikiPageID "31157948".
• Serial_module wikiPageRevisionID "605588163".
• Serial_module hasPhotoCollection Serial_module.
• Serial_module subject Category:Module_theory.
• Serial_module subject Category:Ring_theory.
• Serial_module comment "In abstract algebra, a uniserial module M is a module over a ring R, whose submodules are totally ordered by inclusion. This means simply that for any two submodules N1 and N2 of M, either or . A module is called a serial module if it is a direct sum of uniserial modules. A ring R is called a right uniserial ring if it is uniserial as a right module over itself, and likewise called a right serial ring if it is a right serial module over itself.".
• Serial_module label "Serial module".
• Serial_module sameAs m.0gjbfg0.
• Serial_module sameAs Q17103209.
• Serial_module sameAs Q17103209.
• Serial_module wasDerivedFrom Serial_module?oldid=605588163.
• Serial_module isPrimaryTopicOf Serial_module.