Proceedings of the American Mathematical Society

			Journals Home Search Author Info Subscribe Tech Support My Subscriptions Help
ISSN 1088-6826(e) ISSN 0002-9939(p)

Absolutely indecomposable modules

Author(s): Rüdiger Göbel; Saharon Shelah
Journal: Proc. Amer. Math. Soc. 135 (2007), 1641-1649.
MSC (2000): Primary 13C05, 13C10, 13C13, 20K15, 20K25, 20K30; Secondary 03E05, 03E35
Posted: January 8, 2007
MathSciNet review: 2286071
Retrieve article in: PDF

Abstract | References | Similar articles | Additional information

Abstract: A module is called absolutely indecomposable if it is directly indecomposable in every generic extension of the universe. We want to show the existence of large abelian groups that are absolutely indecomposable. This will follow from a more general result about -modules over a large class of commutative rings with endomorphism ring which remains the same when passing to a generic extension of the universe. It turns out that `large' in this context has a precise meaning, namely being smaller than the first $\omega$ -Erdos cardinal defined below. We will first apply a result on large rigid valuated trees with a similar property established by Shelah in 1982, and will prove the existence of related ` $R_\omega$ -modules' (-modules with countably many distinguished submodules) and finally pass to -modules. The passage through $R_\omega$ -modules has the great advantage that the proofs become very transparent essentially using a few `linear algebra' arguments also accessible for graduate students. The result closes a gap of Eklof and Shelah (1999) and Eklof and Mekler (2002), provides a good starting point for Fuchs and Göbel, and gives a new construction of indecomposable modules in general using a counting argument.

References:

1.: C. Böttinger and R. Göbel, Endomorphism algebras of modules with distinguished partially ordered submodules over commutative rings, J. Pure Appl. Algebra 76 (1991), 121 - 141. MR 1145861 (93c:16027)
2.: G. Braun and R. Göbel, Outer automorphism groups of locally finite -groups, J. Algebra 264 (2003), 55 - 67. MR 1980685 (2004d:20035)
3.: S. Brenner, Endomorphism algebras of vector spaces with distinguished sets of subspaces, J. Algebra 6 (1967), 100 - 114. MR 0209319 (35:217)
4.: S. Brenner and M.C.R. Butler, Endomorphism rings of vector spaces and torsion free abelian groups, J. London Math. Soc. 40 (1965), 183 - 187. MR 0174593 (30:4794)
5.: A. L. S. Corner, Endomorphism algebras of large modules with distinguished submodules, J. Algebra 11 (1969), 155 - 185. MR 0237557 (38:5838)
6.: A. L. S. Corner, Fully rigid systems of modules, Rendiconti Sem. Mat. Univ. Padova 82 (1989), 55 - 66. MR 1049584 (91d:13016)
7.: A. L. S. Corner and R. Göbel, Prescribing endomorphism algebras - A unified treatment, Proc. London Math. Soc. (3) 50 (1985), 447 - 479. MR 0779399 (86h:16031)
8.: A.L.S. Corner and R. Göbel, Small almost free modules with prescribed topological endomorphism rings, Rendiconti Sem. Mat. Univ. Padova 109 (2003) 217 - 234. MR 1997988 (2004e:20101)
9.: M. Dugas and R. Göbel, Automorphism groups of fields II, Commun. in Algebra 25 (1997), 3777 - 3785. MR 1481565 (98j:12005)
10.: M. Dugas and R. Göbel, Automorphism groups of geometric lattices, Algebra Universalis 45 (2001), no. 4, 425-433. MR 1816977 (2001k:06013)
11.: P. Eklof and A. Mekler, Almost free modules, set-theoretic methods (revised edition), North-Holland, Elsevier, Amsterdam, 2002. MR 1914985 (2003e:20002)
12.: P. Eklof and S. Shelah, Absolutely rigid systems and absolutely indecomposable groups, Abelian Groups and Modules, Trends in Math. (Birkhäuser, 1999), 257 - 268. MR 1735574 (2001d:20050)
13.: B. Franzen and R. Göbel, The Brenner-Butler-Corner theorem and its applications to modules, in: Abelian Group Theory, Gordon & Breach Science Publishers, London, 1987, 209 - 227. MR 1011314 (90g:16029)
14.: E. Fried and J. Kollar, Automorphism groups of fields, Colloqu. Math. Soc. Janos Bolyai 29 (1977), 293 - 317. MR 0660867 (84i:12020)
15.: L. Fuchs, Abelian Groups, vol. 2, Academic Press, 1973. MR 0349869 (50:2362)
16.: L. Fuchs and R. Göbel, Modules with absolute endomorphism rings, submitted.
17.: R. Göbel, Vector spaces with five distinguished subspaces, Results in Mathematics 11 (1987), 211 - 228. MR 0897298 (88g:13010)
18.: R. Göbel and W. May, Four submodules suffice for realizing algebras over commutative rings, J. Pure Appl. Algebra 65 (1990), 29 - 43. MR 1065061 (91j:16036)
19.: R. Göbel and W. May, Independence in completions and endomorphism algebras, Forum Math. 1 (1989), 215 - 226. MR 1005423 (90j:16070)
20.: R. Göbel and S. Shelah, Indecomposable almost free modules|the local case, Canadian J. Math. 50 (1998), 719 - 738. MR 1638607 (99i:13014)
21.: R. Göbel and J. Trlifaj, Endomorphism Algebras and Approximations of Modules, Walter de Gruyter Verlag, Berlin, Expositions in Mathematics, Vol. 41 (2006).
22.: H. Heineken, Automorphism groups of torsionfree nilpotent groups of class two. Symposia Mathematica 17 (1976), 235 - 250. MR 0419627 (54:7645)
23.: T. Jech, Set Theory, Academic Press, 1978. MR 0506523 (80a:03062)
24.: C. St. J. A. Nash-Williams, On well-quasi-ordering infinite trees, Proc. Camb. Phil. Soc. 61 (1965), 697 - 720. MR 0175814 (31:90)
25.: S. Shelah, Infinite abelian groups, Whitehead problem and some constructions, Israel J. Math. 18 (1974), 243 - 256. MR 0357114 (50:9582)
26.: S. Shelah, Better quasi-orders for uncountable cardinals, Israel J. Math. 42 (1982), 177 - 226. MR 0687127 (85b:03085)
27.: D. Simson, Linear Representations of Partially Ordered Sets and Vector Space Categories, Algebra, Logic and Applications, Vol. 4, Gordon & Breach Science Publishers, London, 1992. MR 1241646 (95g:16013)

	Publications Meetings The Profession Membership Programs Math Samplings Policy & Advocacy In the News About the AMS
\|