JOURNAL OF SHANDONG UNIVERSITY(NATURAL SCIENCE) ›› 2020, Vol. 55 ›› Issue (4): 32-40.doi: 10.6040/j.issn.1671-9352.0.2019.458

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GI-modules and coreflexive complexes

LIU Yan-ping   

  1. College of Economics, Northwest Normal University, Lanzhou 730070, Gansu, China
  • Published:2020-04-09

Abstract: A class of GI-modules, coreflexive complexes and their properties are investigated. It is proved that an artinian module has finite GI-dimension if and only if it is coreflexive as a complex. The GI-dimension of complexes is also studied and it is found that a complex homologically degreewise artinian and bounded to the left has finite GI-dimension if and only if it is coreflexive.

Key words: Gorenstein injective module, GI-class, coreflexive complex, GI-dimension

CLC Number: 

  • O153.3
[1] ENOCHS E E, JENDA O M G. On Gorenstein injective modules[J]. Communications in Algebra, 1993, 21(10):3489-3501.
[2] AUSLANDER M, BRIDGER M. Stable module theory[J]. Memoirs of the American Mathematical Society, 1969, 94(94):9-11.
[3] CHRISTENSEN L W. Gorenstein dimensions[M]. Berlin: Springer-Verlag, 2000.
[4] CHRISTENSEN L W, FRANKILD A, HOLM H. On Gorenstein projective, injective and flat dimensions: a functorial description with applications[J]. Journal of Algebra, 2006, 302(1):231-279.
[5] ENOCHS E E, JENDA O M G. Gorenstein injective and projective modules[J]. Mathematische Zeitschrift, 1995, 220(4):611-633.
[6] KHATAMI L, TOUSI M, YASSEMI S. Finiteness of Gorenstein injective dimension of modules[J]. Proceedings of the American Mathematical Society, 2009, 137(7):2201-2207.
[7] KHATAMI L, YASSEMI S. A Bass formula for Gorenstein injective dimension[J]. Communications in Algebra, 2007, 35(6):1882-1889.
[8] XU Jinzhong. Flat covers of modules[M]. Berlin: Springer-Verlag, 1996.
[9] HIREMATH V A. Coflat modules[J]. Indian Journal of Pure and Applied Mathematics, 1986, 17(2):223-230.
[10] ENOCHS EE, JENDA O M G. Relative homological algebra[M]. Berlin: Walter de Gruyter, 2000.
[11] SAZEEDEH R.Gorenstein injective modules and a generalization of Ischebeck formula[J]. Journal of Algebra and Its Applications, 2013, 12(4):1250197.
[12] CHRISTENSEN L W. Semi-dualizing complexes and their Auslander categories[J]. Transactions of the American Mathematical Society, 2001, 353(5):1839-1883.
[13] FRANKILD A, JORGENSEN P. Foxby equivalence, complete modules, and torsion modules[J]. Journal of Pure and Applied Algebra, 2002, 174(2):135-147.
[1] WANG Chao. Gorenstein injective modules over upper triangular matrix Artin algebras [J]. JOURNAL OF SHANDONG UNIVERSITY(NATURAL SCIENCE), 2016, 51(2): 89-93.
[2] WANG Xin-xin. Strongly Ω-Gorenstein injective modules [J]. J4, 2013, 48(2): 23-26.
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