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MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS

Yıl 2010, Cilt: 39 Sayı: 4, 477 - 487, 01.04.2010

Öz

We study modules whose maximal submodules are supplements (direct summands). For a locally projective module, we prove that every maximal submodule is a direct summand if and only if it is semisimple and projective. We give a complete characterization of the modules whose maximal submodules are supplements over Dedekind domains

Kaynakça

  • Alizade, R., Bilhan, G. and Smith, P. F. Modules whose maximal submodules have supple- ments, Comm. Algebra 29, 2389–2405, 2001.
  • Anderson, F. W. and Fuller, K. R. Rings and Categories of Modules (Springer, New York, ). Clark, J., Lomp, C., Vanaja, N. and Wisbauer, R. Lifting Modules. Supplements and Pro- jectivity in Module Theory, (Frontiers in Mathematics, Birkh¨auser, Basel, 2006).
  • Cohn, P. M. Basic Algebra (Springer, London, 2003).
  • Drinfeld, V. Infinite–dimensional vector bundles in algebraic geometry: an introduction, in The Unity of Mathematics(Birkh¨auser, Boston, 2006), 263–304.
  • Estrada, S., Guil Asensio, P. A., Prest, M. and Trlifaj, J. Model category structures arising from Drinfeld vector bundles, Work in progress. Dung, N. V., Huynh, D. V., Smith, P. F. and Wisbauer, R. Extending Modules (Long- man:Burnt Mill, 1994).
  • Eklof, P. C. Modules with strange decomposition properties. Infinite length modules, Biele- feld, 75–87, 1998 (Trends Math., Birkh¨auser, Basel, 2000).
  • Eklof, P. C. and Shelah, S. The Kaplansky test problems for ℵ1-separable groups, Proc. Amer. Math. Soc. 126 (7), 1901–1907, 1998.
  • Gruson, L. and Raynaud, M. Crit`eres de platitude et de projectivit´e. Techniques de “plati- fication” d’un module, Invent. Math. 13, 1–89, 1971.
  • Guil Asensio, P. A., Izurdiaga, M. C. and Torrecillas, B. Decomposition properties of strict Mittag-Leffler modules, J. Algebra 310, 290–302, 2007.
  • Guil Asensio, P. A., Izurdiaga, M. C. and Torrecillas, B. Accesible subcategories of modules and pathological objects, Forum Math. 22 (3), 485–507, 2010.
  • Kasch, F. Modules and Rings (Academic Press, London, 1982).
  • Lam, T. Y. Lectures on Modules and Rings (Springer-Verlag, New York, 1999).
  • Mcconnel, J. C. and Robson, J. C. Homomorphisms and extensions of modules over certain differential polynomial rings, J. Algebra 26, 319–342, 1973.
  • Mohamed, S. H. and M¨uller, B.J. Continuous and Discrete Modules (Cambridge University Press, New York, 1990).
  • Sharp, R. Y. Steps in Commutative Algebra (Cambridge University Press, Cambridge, 1990).
  • Sharpe, D. W. and Vamos, P. Injective Modules (Cambridge University Press, Cambridge, ). Wisbauer, R. Foundations of Modules and Rings (Gordon and Breach, Reading, 1991).
  • Zimmermann-Huisgen, B. Pure submodules of direct products of free modules, Math. Ann. (3), 233–245, 1976.
  • Zimmermann-Huisgen, B. On the abundance of ℵ1-separable modules, in: Abelian Groups and Noncommutative Rings, Contemp. Math.130, 167–180, 1992.
  • Z¨oschinger, H. Komplementierte moduln ¨uber Dedekindringen, J. Algebra 29, 42–56, 1974.

MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS

Yıl 2010, Cilt: 39 Sayı: 4, 477 - 487, 01.04.2010

Öz

Kaynakça

  • Alizade, R., Bilhan, G. and Smith, P. F. Modules whose maximal submodules have supple- ments, Comm. Algebra 29, 2389–2405, 2001.
  • Anderson, F. W. and Fuller, K. R. Rings and Categories of Modules (Springer, New York, ). Clark, J., Lomp, C., Vanaja, N. and Wisbauer, R. Lifting Modules. Supplements and Pro- jectivity in Module Theory, (Frontiers in Mathematics, Birkh¨auser, Basel, 2006).
  • Cohn, P. M. Basic Algebra (Springer, London, 2003).
  • Drinfeld, V. Infinite–dimensional vector bundles in algebraic geometry: an introduction, in The Unity of Mathematics(Birkh¨auser, Boston, 2006), 263–304.
  • Estrada, S., Guil Asensio, P. A., Prest, M. and Trlifaj, J. Model category structures arising from Drinfeld vector bundles, Work in progress. Dung, N. V., Huynh, D. V., Smith, P. F. and Wisbauer, R. Extending Modules (Long- man:Burnt Mill, 1994).
  • Eklof, P. C. Modules with strange decomposition properties. Infinite length modules, Biele- feld, 75–87, 1998 (Trends Math., Birkh¨auser, Basel, 2000).
  • Eklof, P. C. and Shelah, S. The Kaplansky test problems for ℵ1-separable groups, Proc. Amer. Math. Soc. 126 (7), 1901–1907, 1998.
  • Gruson, L. and Raynaud, M. Crit`eres de platitude et de projectivit´e. Techniques de “plati- fication” d’un module, Invent. Math. 13, 1–89, 1971.
  • Guil Asensio, P. A., Izurdiaga, M. C. and Torrecillas, B. Decomposition properties of strict Mittag-Leffler modules, J. Algebra 310, 290–302, 2007.
  • Guil Asensio, P. A., Izurdiaga, M. C. and Torrecillas, B. Accesible subcategories of modules and pathological objects, Forum Math. 22 (3), 485–507, 2010.
  • Kasch, F. Modules and Rings (Academic Press, London, 1982).
  • Lam, T. Y. Lectures on Modules and Rings (Springer-Verlag, New York, 1999).
  • Mcconnel, J. C. and Robson, J. C. Homomorphisms and extensions of modules over certain differential polynomial rings, J. Algebra 26, 319–342, 1973.
  • Mohamed, S. H. and M¨uller, B.J. Continuous and Discrete Modules (Cambridge University Press, New York, 1990).
  • Sharp, R. Y. Steps in Commutative Algebra (Cambridge University Press, Cambridge, 1990).
  • Sharpe, D. W. and Vamos, P. Injective Modules (Cambridge University Press, Cambridge, ). Wisbauer, R. Foundations of Modules and Rings (Gordon and Breach, Reading, 1991).
  • Zimmermann-Huisgen, B. Pure submodules of direct products of free modules, Math. Ann. (3), 233–245, 1976.
  • Zimmermann-Huisgen, B. On the abundance of ℵ1-separable modules, in: Abelian Groups and Noncommutative Rings, Contemp. Math.130, 167–180, 1992.
  • Z¨oschinger, H. Komplementierte moduln ¨uber Dedekindringen, J. Algebra 29, 42–56, 1974.
Toplam 19 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular İstatistik
Bölüm Matematik
Yazarlar

Engin Büyükasik Bu kişi benim

 dilek Pusat-yilmaz Bu kişi benim

Yayımlanma Tarihi 1 Nisan 2010
Yayımlandığı Sayı Yıl 2010 Cilt: 39 Sayı: 4

Kaynak Göster

APA Büyükasik, E., & Pusat-yilmaz, . (2010). MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS. Hacettepe Journal of Mathematics and Statistics, 39(4), 477-487.
AMA Büyükasik E, Pusat-yilmaz . MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS. Hacettepe Journal of Mathematics and Statistics. Nisan 2010;39(4):477-487.
Chicago Büyükasik, Engin, ve  dilek Pusat-yilmaz. “MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS”. Hacettepe Journal of Mathematics and Statistics 39, sy. 4 (Nisan 2010): 477-87.
EndNote Büyükasik E, Pusat-yilmaz  (01 Nisan 2010) MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS. Hacettepe Journal of Mathematics and Statistics 39 4 477–487.
IEEE E. Büyükasik ve  . Pusat-yilmaz, “MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS”, Hacettepe Journal of Mathematics and Statistics, c. 39, sy. 4, ss. 477–487, 2010.
ISNAD Büyükasik, Engin - Pusat-yilmaz, dilek. “MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS”. Hacettepe Journal of Mathematics and Statistics 39/4 (Nisan 2010), 477-487.
JAMA Büyükasik E, Pusat-yilmaz . MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS. Hacettepe Journal of Mathematics and Statistics. 2010;39:477–487.
MLA Büyükasik, Engin ve  dilek Pusat-yilmaz. “MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS”. Hacettepe Journal of Mathematics and Statistics, c. 39, sy. 4, 2010, ss. 477-8.
Vancouver Büyükasik E, Pusat-yilmaz . MODULES WHOSE MAXIMAL SUBMODULES ARE SUPPLEMENTS. Hacettepe Journal of Mathematics and Statistics. 2010;39(4):477-8.