CONSTRUCTION OF MODULES WITH A PRESCRIBED DIRECT SUM DECOMPOSITION

Yıl 2014, , 218 - 248, 01.06.2014

Dolors Herbera

https://doi.org/10.24330/ieja.266249

Cited By: 1

Öz

We give some criteria for recognizing local rings that allow us to
show that indecomposable AB5∗ modules over commutative rings and couniform
modules over noetherian commutative rings have a local endomorphism
ring. We also develop some theory on methods to construct modules with
a prescribed direct-sum decomposition. As an application we realize an interesting
class of commutative monoids as monoids of direct summands of a
direct sum of a countable number of copies of a suitable artinian cyclic module,
showing that there may appear a rich supply of direct summands that are
not a direct sum of artinian modules. An important gadget for proving our
realization result is a variation of a method for realizing a given ring as the
endomorphism ring of a cyclic (artinian) module due to Armendariz, Fisher
and Snider.

Anahtar Kelimeler

AB5∗-module, artinian module, semilocal ring, couniform module, category equivalence, monoid, direct-sum, pullback, pushout

Kaynakça

• E. P. Armendariz, J. W. Fisher and R. L. Snider, On injective and surjective endomorphisms of finitely generated modules, Comm. Alg., 7 (1978), 659–672. [2] R. Camps and W. Dicks, On semilocal rings, Israel J. Math., 81 (1993), 203– 211.
• R. Camps and A. Facchini, The Pr¨ufer rings that are endomorphism rings of Artinian modules, Comm. Algebra, 22 (1994), 3133–3157.
• R. Camps and P. Menal, Power cancellation for artinian modules, Comm. Algebra, 19 (1991), 2081–2095.
• A. Facchini, Fiber products and Morita duality for commutative rings, Rend. Sem. Mat. Univ. Padova, 67 (1982), 143–159.
• A. Facchini, Module Theory. Endomorphism Rings and Direct Sum Decompo- sitions in Some Classes of Modules, Progress in Math. 167, Birkh¨auser Verlag, Basel, 1998.
• A. Facchini, D. Herbera, Kof a semilocal ring, J. Algebra, 225 (2000), 47–69. [8] A. Facchini, D. Herbera, L. Levy and P. V´amos, Krull-Schmidt fails for Ar- tinian modules, Proc. Amer. Math. Soc., 123 (1995), 3587–3592.
• A. Facchini and P. V´amos, Injective modules over pullbacks, J. London Math. Soc., (2) 31(3) (1985), 425–438.
• C. Faith and D. Herbera, Endomorphism rings and tensor products of linearly compact modules, Comm. Algebra, 25(4) (1997), 1215–1255.
• J. W. Fisher, Nil subrings of endomorphism rings of modules, Proc. Amer. Math. Soc., 34 (1972), 75–78.
• D. Eisenbud and J. C. Robson, Hereditary Noetherian prime rings, J. of Alge- bra, 16 (1970), 86–104.
• V. N. Gerasimov and I. I. Sakhaev, A counterexample to two hypotheses on pro- jective and flat modules (Russian), Sib. Mat. Zh., 25(6) (1984), 31–35. English translation: Sib. Math. J., 24 (1984), 855–859.
• K. R. Goodearl and R. B. Warfield, Simple modules over hereditary Noetherian prime rings, J. of Algebra, 57 (1979), 82–100.
• K. R. Goodearl and R. B. Warfield, An Introduction to Noncommutative Noe- therian Rings, London Mathematical Society Student Texts 16, Cambridge University Press, Cambridge, 1989.
• D. Herbera and P. Pˇr´ıhoda, Big projective modules over Noetherian semilocal rings, J. Reine und Angew. Math., 648 (2010), 111–148.
• D. Herbera and P. Pˇr´ıhoda, Infinitely generated modules over pullbacks of rings, Trans. Amer. Math. Soc., 366(3) (2014), 1433–1454.
• D. Herbera and A. Shamsuddin, Modules with semi-local endomorphism ring, Proc. Amer. Math. Soc., 123 (1995), 3593–3600.
• W. Krull, Matrizen, Moduln und verallgemeinerte Abelsche Gruppen im Bere- ich der ganzen algebraischen Zahlen, Heidelberger Akad. Wiss., 2 (1932), 13– 38.
• B. Lemonnier, AB-5*et la dualit´e de Morita, C.R. Acad. Sc. Paris, 289 (1979), Series A, 47-50.
• T. H. Lenagan, Bounded hereditary Noetherian prime rings, J. London Math. Soc., 6(2) (1973), 241–246.
• G. J. Leuschke and R. Wiegand, Cohen-Macaulay Representations, Mathe- matical Surveys and Monographs, 181, American Mathematical Society, Prov- idence, RI, 2012.
• J. C. McConnell and J. C. Robson, Noncommutative Noetherian Rings, Grad- uate Studies in Mathematics 30, American Mathematical Society, Providence (Rhode Island), 1987 (reprinted 2001).
• E. Matlis, 1-Dimensional Cohen-Macaulay rings, Lect. Notes in Math., 327, Springer-Verlag, 1973.
• K. I. Pimenov and A. V. Yakovlev, Artinian modules over a matrix ring, In: Infinite Lenght Modules, H. Krause and C. M. Ringel Eds., Trends in Math., Birkh¨auser, Basel, 2000, 101–105.
• P. Pˇr´ıhoda, Projective modules are determined by their radical factors, J. Pure Applied Algebra, 210 (2007), 827–835.
• G. Puninski, When every projective module is a direct sum of finitely generated modules, preprint 2005.
• C. M. Ringel, Krull-Remak.Schmidt fails for Artinian modules over local rings, Algebras and Rep. Theory, 4 (2001), 77–86.
• R. B. Warfield Jr., Exchange rings and decompositions of modules, Math. Ann., 199 (1972), 31–36.
• R. B. Warfield Jr., Cancellation of modules and groups and stable range of endomorphism rings, Pacific J. Math., 91 (1980), 457–485.
• R. Wiegand, Direct-sum decompositions over local rings, J. Algebra, 240(1) (2001), 83–97.
• A. V. Yakovlev, On direct decompositions of p-adic groups, (Russian) Algebra i Analiz, 12(6) (2000), 217–223; translation in St. Petersburg Math. J., 12(6) (2001), 1043–1047.
• B. Zimmermann-Huisgen and W. Zimmermann, Classes of modules with the exchange property, J. Algebra, 88(2) (1984), 416–434.
• W. Zimmermann, Rein injektive direkte summen von moduln, Comm. Algebra, 5(10) (1977), 1083–1117. Dolors Herbera
• Departament de Matem`atiques
• Universitat Aut`onoma de Barcelona
• E-08193 Bellaterra (Barcelona), Spain
• e-mail: dolors@mat.uab.cat