Finitely-generated module

Results: 74



#Item
1Sean Sather-Wagstaff and Richard Wicklein* (). Codualizing Complexes. Preliminary report. Let R be a commutative, noetherian ring. A finitely generated R-module C is said to be semd

Sean Sather-Wagstaff and Richard Wicklein* (). Codualizing Complexes. Preliminary report. Let R be a commutative, noetherian ring. A finitely generated R-module C is said to be semd

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Source URL: jointmathematicsmeetings.org

- Date: 2013-09-18 02:36:48
    2CATEGORIES AND HOMOLOGICAL ALGEBRA Exercises for April 26 Exercise 1. Let R be a principal ideal domain. If M is a finitely generated R-module, show that M is a projective R-module ⇐⇒ M is a free R-module ⇐⇒ M is

    CATEGORIES AND HOMOLOGICAL ALGEBRA Exercises for April 26 Exercise 1. Let R be a principal ideal domain. If M is a finitely generated R-module, show that M is a projective R-module ⇐⇒ M is a free R-module ⇐⇒ M is

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    Source URL: www.math.ru.nl

    Language: English - Date: 2018-05-17 10:22:49
      3Bounded regularity Claus Diem October 7, 2014 Abstract Let k be a field and S the polynomial ring k[x1 , . . . , xn ]. For a nontrivial finitely generated homogeneous S-module M with grading in Z, an integer D and some h

      Bounded regularity Claus Diem October 7, 2014 Abstract Let k be a field and S the polynomial ring k[x1 , . . . , xn ]. For a nontrivial finitely generated homogeneous S-module M with grading in Z, an integer D and some h

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      Source URL: www.mathematik.uni-leipzig.de

      Language: English - Date: 2016-02-04 06:50:35
        4573 Documenta Math. On the Structure of Selmer Groups of Λ-Adic Deformations over p-Adic Lie Extensions

        573 Documenta Math. On the Structure of Selmer Groups of Λ-Adic Deformations over p-Adic Lie Extensions

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        Source URL: documenta.sagemath.org

        Language: English - Date: 2012-10-26 17:22:50
        5A FLAVOUR OF NONCOMMUTATIVE ALGEBRA (PART 2) VIPUL NAIK Abstract. This is the second part of a two-part series intended to give the author and readers a flavour of noncommutative algebra. The material is related to topic

        A FLAVOUR OF NONCOMMUTATIVE ALGEBRA (PART 2) VIPUL NAIK Abstract. This is the second part of a two-part series intended to give the author and readers a flavour of noncommutative algebra. The material is related to topic

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        Source URL: files.vipulnaik.com

        Language: English - Date: 2016-08-13 11:33:29
        6THE LIMIT OF Fp -BETTI NUMBERS OF A TOWER OF FINITE COVERS WITH AMENABLE FUNDAMENTAL GROUPS arXiv:1003.0434v1 [math.KT] 1 Mar 2010 ¨

        THE LIMIT OF Fp -BETTI NUMBERS OF A TOWER OF FINITE COVERS WITH AMENABLE FUNDAMENTAL GROUPS arXiv:1003.0434v1 [math.KT] 1 Mar 2010 ¨

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        Source URL: 131.220.77.52

        Language: English - Date: 2011-03-02 09:33:08
        7AAECC manuscript No. (will be inserted by the editor) Gr¨ obner Basis Cryptosystems Peter Ackermann and Martin Kreuzer

        AAECC manuscript No. (will be inserted by the editor) Gr¨ obner Basis Cryptosystems Peter Ackermann and Martin Kreuzer

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        Source URL: www.symbcomp.fim.uni-passau.de

        Language: English - Date: 2014-10-23 06:42:14
        8ON THE LINEARITY DEFECT OF THE RESIDUE FIELD LIANA M. S ¸ EGA Abstract. Given a commutative Noetherian local ring R, the linearity defect of a finitely generated R-module M , denoted ldR (M ), is an invariant that measu

        ON THE LINEARITY DEFECT OF THE RESIDUE FIELD LIANA M. S ¸ EGA Abstract. Given a commutative Noetherian local ring R, the linearity defect of a finitely generated R-module M , denoted ldR (M ), is an invariant that measu

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        Source URL: s.web.umkc.edu

        Language: English - Date: 2013-03-19 13:51:55
          9Finitely Generated p-Primary Modules over PIDs E. L. Lady ASSUMPTIONS. R is a principal ideal domain and (p) is a prime ideal. M is a module such that pk M = 0 and pk−1 M 6= 0 . Furthermore m ∈ M is such that pk−1

          Finitely Generated p-Primary Modules over PIDs E. L. Lady ASSUMPTIONS. R is a principal ideal domain and (p) is a prime ideal. M is a module such that pk M = 0 and pk−1 M 6= 0 . Furthermore m ∈ M is such that pk−1

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          Source URL: www.math.hawaii.edu

          Language: English - Date: 2001-04-07 05:36:01
            10Sage Reference Manual: Modules Release 6.7 The Sage Development Team June 24, 2015

            Sage Reference Manual: Modules Release 6.7 The Sage Development Team June 24, 2015

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            Source URL: doc.sagemath.org

            Language: English - Date: 2015-06-24 05:21:38