Abelian Groups - László Fuchs [Springer]

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References 715 A.A. Fomin — [1] Tensor product of torsion-free abelian groups. Sibirsk. Mat. ˘Z. 16, 1071–1080 (1975). — [2] Duality in certain classes of torsion-free abelian groups of finite rank [Russian]. Sibirsk. Mat. ˘Z. 27(4), 117–127 (1986). — [3] Quotient divisible mixed groups, in Abelian Groups, Rings and Modules. Contemporary Mathematics, vol. 273 (American Mathematical Society, Providence, RI, 2001), pp. 117–128 A.A. Fomin, W.J. Wickless — [1] Quotient divisible abelian groups. Proc. Am. Math. Soc. 126, 45–52 (1998) S.V. Fomin — [1] Über periodische Untergruppen der unendlichen abelschen Gruppen. Mat. Sbornik 2, 1007–1009 (1937) B. Franzen — [1] Algebraic compactness and filtered quotients, in Abelian Group Theory. Lecture Notes in Mathematics, vol. 874 (Springer, Berlin, 1981), pp. 228–241 B. Franzen, B. Goldsmith — [1] On endomorphism algebras of mixed modules. J. Lond. Math. Soc. 31, 468–472 (1985) H. Freedman — [1] The automorphisms of countable primary reduced abelian groups. Proc. Lond. Math. Soc. 12, 77–99 (1962). — [2] On the additive group of a torsion-free ring of rank two. Publ. Math. Debrecen 20, 85–87 (1973) E. Fried — [1] On the subgroups of an abelian group that are ideals in every ring, in Proceedings of the Colloquium on Abelian Groups (Akadémiai Kiadó, Budapest, 1964), pp. 51–54 G. Frobenius, L. Stickelberger — [1] Über Gruppen von vertauschbaren Elementen. J. Reine Angew. Math. 86, 217–262 (1878) L. Fuchs — [1] The direct sum of cyclic groups. Acta Math. Acad. Sci. Hungar. 3, 177–195 (1952). — [2] On the structure of abelian p-groups. Acta Math. Acad. Sci. Hungar. 4, 267– 288 (1953). — [3] On a property of basic subgroups. Acta Math. Acad. Sci. Hungar. 5, 143–144 (1954). — [4] On abelian torsion groups which can not be represented as the direct sum of a given cardinal number of components. Acta Math. Acad. Sci. Hungar. 7, 115–124 (1956). — [5] Ringe und ihre additive Gruppe. Publ. Math. Debrecen 4, 488–508 (1956). — [6] Über das Tensorprodukt von Torsionsgruppen. Acta Sci. Math. Szeged 18, 29–32 (1957). — [7] On quasi nil groups. Acta Sci. Math. Szeged 18, 33–43 (1957). — [8] Wann folgt die Maximalbedingung aus der Minimalbedingung? Arch. Math. 8, 317–319 (1957). — [9] On a directly indecomposable abelian group of power greater than continuum. Acta Math. Acad. Sci. Hungar. 8, 453–454 (1957). — [10] On character groups of discrete abelian groups. Acta Math. Acad. Sci. Hungar. 10, 133–140 (1959). — [11] Notes on abelian groups. I. Annales Univ. Sci. Budapest 2, 5–23 (1959). — [12] The existence of indecomposable abelian groups of arbitrary power. Acta Math. Acad. Sci. Hungar. 10, 453–457 (1959). — [13] Note on factor groups in complete direct sums. Bull. Acad. Pol. Sci. Cl. III 11, 39–40 (1963). — [14] Recent results and problems on abelian groups, in Topics in Abelian Groups (Chicago, 1963), Scott, Foresman & Co. pp. 9–40. — [15] Note on linearly compact abelian groups. J. Aust. Math. Soc. 9, 433–440 (1969). — [16] Summands of separable abelian groups. Bull. London Math. Soc. 2, 205–208 (1970). — [17] Note on decompositions of torsion-free abelian groups. Comment. Math. Helvetici 46, 409–413 (1971). — [18] Indecomposable abelian groups of measurable cardinalities. Symposia Math. 13, 233–244 (1974). — [19] On torsion abelian groups quasiprojective over their endomorphism rings. Proc. Am. Math. Soc. 42, 13–15 (1974). — [20] On p !Cn -projective p-groups. Publ. Math. Debrecen 23, 309–313 (1976). — [21] Butler groups of infinite rank. J. Pure Appl. Algebra 98, 25–44 (1995). — [22] Large indecomposable modules with many automorphisms. Houst. J. Math. 23, 959–966 (2007) L. Fuchs, R. Göbel — [1] Union of slender groups. Arch. Math. 87, 6–14 (2006). — [2] Cellular covers of abelian groups. Results Math. 53, 59–76 (2009) L. Fuchs, P. Gräbe — [1] Numbers of indecomposable summands in direct decompositions of torsion-free abelian groups. Rend. Sem. Mat. Univ. Padova 53, 135–148 (1975) L. Fuchs, I. Halperin — [1] On the imbedding of a regular ring in a regular ring with identity. Fund. Math. 54, 285–290 (1964) L. Fuchs, P. Hill — [1] The balanced-projective dimension of abelian p-groups. Trans. Am. Math. Soc. 293, 99–112 (1986)
716 References L. Fuchs, K.H. Hofmann — [1] Extensions of compact abelian groups by discrete ones and their duality theory. I. J. Algebra 196, 578–594 (1997) L. Fuchs, J.M. Irwin — [1] On p !C1 -projective p-groups. Proc. Lond. Math. Soc. 30, 459–470 (1975) L. Fuchs, F. Loonstra — [1] On direct decompositions of torsion-free abelian groups of finite rank. Rend. Sem. Mat. Univ. Padova 44, 175–183 (1970) L. Fuchs, M. Magidor — [1] Butler groups of arbitrary cardinality. Isr. J. Math. 84, 239–263 (1993) L. Fuchs, C. Metelli — [1] On a class of Butler groups. Manuscripta Math. 71, 1–28 (1991). — [2] Indecomposable Butler groups of large cardinalities. Arch. Math. 57, 339–344 (1991). — [3] Countable Butler groups, in Contemporary Mathematics, vol. 130 (American Mathematical Society, Providence, RI, 1992), pp. 133–143 L. Fuchs, C. Metelli, K.M. Rangaswamy — [1] Corank one subgroups of completely decomposable abelian groups. Commun. Algebra 22, 1031–1037 (1994) L. Fuchs, K.M. Rangaswamy — [1] On generalized regular rings. Math. Z. 107, 71–81 (1968). — [2] Quasi-projective abelian groups. Bull. Soc. Math. France 98, 5–8 (1970). — [3] Unions of chains of Butler groups, in Abelian Group Theory and Related Topics, Contemporary Mathematics, vol. 171 (American Mathematical Society, Providence, RI, 1994), pp. 141–146. — [4] Chains of projective modules. J. Algebra Appl. 10, 167–180 (2011) L. Fuchs, L. Salce — [1] Almost totally injective p-groups. Quaest. Math. 1, 225–234 (1976). — [2] Abelian p-groups of not limit length. Comment. Math. Univ. St. Pauli 26, 25–33 (1977) L. Fuchs, L. Salce, P. Zanardo — [1] Note on the transitivity of pure-essential extensions. Colloq. Math. 78, 283–291 (1998) L. Fuchs, G. Viljoen — [1] Note on extensions of Butler groups. Bull. Aust. Math. Soc. 41, 117–122 (1990). — [2] Completely decomposable pure subgroups of completely decomposable abelian groups. Rend. Sem. Mat. Univ. Padova 92, 63–69 (1994) S. Gacsályi — [1] On algebraically closed abelian groups. Publ. Math. Debrecen 2, 292–296 (1952) B.J. Gardner — [1] Rings on completely decomposable torsion-free abelian groups. Comment. Math. Univ. Carolin. 15, 381–392 (1974) O. Gerstner — [1] Algebraische Kompaktheit bei Faktorgruppen von Gruppen ganzzahliger Abbildungen. Manuscr. Math. 11, 103–109 (1974) R.W. Gilmer — [1] Finite rings having a cyclic multiplicative group of units. Am. J. Math. 85, 447–452 (1963) A.J. Giovannitti — [1] Extensions of Butler groups, in Abelian Group Theory. Lecture Notes in Mathematics, vol. 1006 (Springer, Berlin, 1983), pp. 164–170. — [2] A note on proper classes of exact sequences, in Methods in Module Theory. Lecture Notes in Pure and Applied Mathematics, vol. 140 (Marcel Dekker, New York, 1992), pp. 107–116 S. Glaz, C. Vinsonhaler, W. Wickless — [1] Splitting rings for p-local torsion-free groups, in Zerodimensional commutative rings. Lecture Notes in Pure and Applied Mathematics, vol. 171 (Dekker, New York, 1995), pp. 223–239 S. Glaz, W. Wickless — [1] Regular and principal projective endomorphism rings of mixed abelian groups. Commun. Algebra 22, 1161–1176 (1994) R. Göbel — [1] Darstellung von Ringen als Endomorphismenringe. Arch. Math. 35, 338–350 (1980) R. Göbel, D. Herden, S. Shelah — [1] Absolute E-rings. Adv. Math. 226, 235–253 (2011) R. Göbel, W. May — [1] Cancellation of direct sums of countable abelian p-groups. Proc. Am. Math. Soc. 131, 2705–2710 (2003) R. Göbel, S. Pokutta — [1] Construction of dual groups using Martin’s axiom. J. Algebra 320, 2388–2404 (2008) R. Göbel, R. Prelle — [1] Solution of two problems on cotorsion abelian groups. Arch. Math. 31, 423–431 (1978) R. Göbel, S.V. Rychkov, B. Wald — [1] A general theory of slender groups and Fuchs-44-groups, in Abelian Group Theory. Lecture Notes in Mathematics, vol. 874 (Springer, Berlin, 1981), pp. 194–201
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Springer Monographs in Mathematics
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László Fuchs Abelian Groups 123
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Dedicated with love to my wife Shul
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viii Preface to relevant publicatio
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x Preface on abelian groups. The re
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xii Contents 4 Divisibility and Inj
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xiv Contents 7 Whitehead Groups If
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Table of Notations Set Theory ; : s
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Table of Notations xix N .p/: Nunk
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Table of Notations xxi Q A;;A : di
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2 1 Fundamentals is finite, countab
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4 1 Fundamentals Theorem 1.2. In a
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6 1 Fundamentals (8) A superfluous
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8 1 Fundamentals A ! A=K acting as
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10 1 Fundamentals φ G ⏐ ↓ η 0
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12 1 Fundamentals Lemma 2.5 (Snake
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14 1 Fundamentals Exercises (1) Ass
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16 1 Fundamentals non-zero subgroup
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18 1 Fundamentals in Sect. 7 in Cha
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20 1 Fundamentals 4 Sets Since the
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22 1 Fundamentals It might be helpf
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24 1 Fundamentals This is an amazin
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26 1 Fundamentals of subgroups, ind
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28 1 Fundamentals If is an infinit
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30 1 Fundamentals For the proof of
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32 1 Fundamentals C3. Identity. For
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34 1 Fundamentals is exact in D; F
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36 1 Fundamentals 7 Linear Topologi
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38 1 Fundamentals Proof. (We need s
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40 1 Fundamentals For two R-modules
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Chapter 2 Direct Sums and Direct Pr
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1 Direct Sums and Direct Products 4
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2 Direct Summands 51 Proof. If A D
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2 Direct Summands 53 Exercises (1)
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3 Pull-Back and Push-Out Diagrams 5
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4 Direct Limits 57 In this case, A
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4 Direct Limits 59 We now move to t
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5 Inverse Limits 61 for 0 W G ! A
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5 Inverse Limits 63 for every i 2 I
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6 Direct Products vs. Direct Sums 6
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6 Direct Products vs. Direct Sums 6
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7 Completeness in Linear Topologies
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Chapter 3 Direct Sums of Cyclic Gro
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1 Freeness and Projectivity 77 Coro
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1 Freeness and Projectivity 79 Let
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2 Finite and Finitely Generated Gro
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3 Factorization of Finite Groups 87
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3 Factorization of Finite Groups 89
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4 Linear Independence and Rank 91 E
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4 Linear Independence and Rank 93 t
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5 Direct Sums of Cyclic Groups 95 P
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5 Direct Sums of Cyclic Groups 97 s
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6 Equivalent Presentations 99 (5) (
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6 Equivalent Presentations 101 Thes
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6 Equivalent Presentations 103 Equi
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7 Chains of Free Groups 105 For Ded
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7 Chains of Free Groups 107 We can
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7 Chains of Free Groups 109 Hill’
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7 Chains of Free Groups 111 which i
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8 Almost Free Groups 113 (D) Let 0
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8 Almost Free Groups 115 Proof. (a)
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8 Almost Free Groups 117 be done by
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8 Almost Free Groups 119 with. In t
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9 Shelah’s Singular Compactness T
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10 Groups with Discrete Norm 123 Di
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10 Groups with Discrete Norm 125 Ch
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11 Quasi-Projectivity 127 11 Quasi-
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11 Quasi-Projectivity 129 for diffe
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132 4 Divisibility and Injectivity
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150 5 Purity and Basic Subgroups or
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152 5 Purity and Basic Subgroups Pr
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154 5 Purity and Basic Subgroups ge
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158 5 Purity and Basic Subgroups Th
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160 5 Purity and Basic Subgroups ˛
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166 5 Purity and Basic Subgroups 5
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168 5 Purity and Basic Subgroups Le
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172 5 Purity and Basic Subgroups F
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174 5 Purity and Basic Subgroups (H
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176 5 Purity and Basic Subgroups Ma
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180 5 Purity and Basic Subgroups So
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Chapter 6 Algebraically Compact Gro
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1 Algebraic Compactness 185 of the
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1 Algebraic Compactness 187 Na j ;
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1 Algebraic Compactness 189 Here jG
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2 Complete Groups 191 is a Cauchy s
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2 Complete Groups 193 A ⏐ μ A A
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3 The Structure of Algebraically Co
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3 The Structure of Algebraically Co
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4 Pure-Injective Hulls 199 (2) The
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4 Pure-Injective Hulls 201 subgroup
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5 Locally Compact Groups 203 5 Loca
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5 Locally Compact Groups 205 Theore
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6 The Exchange Property 207 Evident
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6 The Exchange Property 209 In the
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6 The Exchange Property 211 to the
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Chapter 7 Homomorphism Groups Abstr
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1 Groups of Homomorphisms 215 (and
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1 Groups of Homomorphisms 217 is an
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1 Groups of Homomorphisms 219 F Not
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2 Algebraically Compact Homomorphis
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2 Algebraically Compact Homomorphis
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3 Small Homomorphisms 225 (3) The a
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3 Small Homomorphisms 227 completio
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Chapter 8 Tensor and Torsion Produc
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1 The Tensor Product 231 with the f
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1 The Tensor Product 233 for matchi
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1 The Tensor Product 235 finitely P
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2 The Torsion Product 237 (6) (a) I
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2 The Torsion Product 239 It is pre
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2 The Torsion Product 241 It remain
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3 Theorems on Tensor Products 243 T
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4 Theorems on Torsion Products 245
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5 Localization 251 (8) (Keef) If A
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5 Localization 253 Exercises (1) If
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256 9 Groups of Extensions and Coto
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300 10 Torsion Groups (A) If C is a
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302 10 Torsion Groups the indicator
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304 10 Torsion Groups 0 −−−
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306 10 Torsion Groups is tantamount
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308 10 Torsion Groups Proof. We hav
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310 10 Torsion Groups (3) Let A be
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312 10 Torsion Groups (C) B is a ba
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314 10 Torsion Groups pure-injectiv
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316 10 Torsion Groups Theorem 3.11
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318 10 Torsion Groups 4 More on Tor
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320 10 Torsion Groups (g) The large
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322 10 Torsion Groups that in torsi
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324 10 Torsion Groups subgroup of B
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326 10 Torsion Groups (c) Homomorph
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328 10 Torsion Groups then Ker con
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330 10 Torsion Groups A class more
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332 10 Torsion Groups with basic su
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334 10 Torsion Groups 8 Valuated Ve
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336 10 Torsion Groups V D A ` B for
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338 10 Torsion Groups Proof. Define
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340 10 Torsion Groups When Socles D
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342 10 Torsion Groups Hill [1] gave
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344 11 p-Groups with Elements of In
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410 12 Torsion-Free Groups is calle
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412 12 Torsion-Free Groups Proof. L
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414 12 Torsion-Free Groups If A is
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416 12 Torsion-Free Groups Exercise
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418 12 Torsion-Free Groups Converse
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420 12 Torsion-Free Groups fa X j a
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422 12 Torsion-Free Groups and 0 !
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424 12 Torsion-Free Groups (ii) If
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426 12 Torsion-Free Groups number o
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428 12 Torsion-Free Groups along B
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430 12 Torsion-Free Groups whenever
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432 12 Torsion-Free Groups If we ha
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434 12 Torsion-Free Groups Then we
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436 12 Torsion-Free Groups (ii) For
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438 12 Torsion-Free Groups (7) (de
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440 12 Torsion-Free Groups it is ro
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442 12 Torsion-Free Groups 1 for `
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444 12 Torsion-Free Groups A D B i
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446 12 Torsion-Free Groups (5) For
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448 12 Torsion-Free Groups Proof. L
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450 12 Torsion-Free Groups local (T
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452 12 Torsion-Free Groups stable r
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454 12 Torsion-Free Groups (3) (War
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456 12 Torsion-Free Groups write x
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458 12 Torsion-Free Groups For thos
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460 12 Torsion-Free Groups A C 1
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462 12 Torsion-Free Groups ˛./.˛
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464 12 Torsion-Free Groups so the s
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466 12 Torsion-Free Groups followed
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468 12 Torsion-Free Groups (i) ther
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470 12 Torsion-Free Groups 11 Duali
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472 12 Torsion-Free Groups Lemma 11
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474 12 Torsion-Free Groups rk p D.A
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476 12 Torsion-Free Groups is proj(
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478 12 Torsion-Free Groups division
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Chapter 13 Torsion-Free Groups of I
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1 Direct Decompositions of Infinite
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2 Slender Groups 489 (6) A torsion-
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2 Slender Groups 491 Example 2.5. T
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2 Slender Groups 493 Proof. From Th
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2 Slender Groups 495 F Notes. The r
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3 Characterizations of Slender Grou
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3 Characterizations of Slender Grou
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4 Separable Groups 501 Exercises (1
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4 Separable Groups 503 where the G
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4 Separable Groups 505 In the follo
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4 Separable Groups 507 c C g D h 2
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5 Vector Groups 509 (7) Show that t
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5 Vector Groups 511 Isomorphism of
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6 Powers ofZ of Measurable Cardinal
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7 Whitehead Groups If V = L 519 (7)
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7 Whitehead Groups If V = L 521 Pro
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7 Whitehead Groups If V = L 523 Sˇ
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8 Whitehead Groups Under Martin’s
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8 Whitehead Groups Under Martin’s
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Chapter 14 Butler Groups Abstract T
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1 Finite Rank Butler Groups 531 and
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1 Finite Rank Butler Groups 533 Pro
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1 Finite Rank Butler Groups 535 Let
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2 Prebalanced and Decent Subgroups
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2 Prebalanced and Decent Subgroups
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3 The Torsion Extension Property 54
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4 Countable Butler Groups 547 (ii)
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5 B 1 -andB 2 -Groups 549 (F) Homog
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6 Solid Subgroups 551 understand th
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6 Solid Subgroups 553 fa n j n
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6 Solid Subgroups 555 Again changin
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7 Solid Chains 557 (4) A corank 1 s
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7 Solid Chains 559 B C1 =B admits
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7 Solid Chains 561 Lemma 7.6 (Bican
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8 Butler Groups of Uncountable Rank
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9 More on Infinite Butler Groups 56
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9 More on Infinite Butler Groups 57
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Chapter 15 Mixed Groups Abstract Mi
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1 Splitting Mixed Groups 575 For ev
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1 Splitting Mixed Groups 577 so A m
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2 Baer Groups are Free 579 (4) (Opp
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2 Baer Groups are Free 581 We note
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2 Baer Groups are Free 583 One does
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3 Valuated Groups. Height-Matrices
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4 Nice, Isotype, and Balanced Subgr
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5 Mixed Groups of Torsion-Free Rank
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5 Mixed Groups of Torsion-Free Rank
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6 Simply Presented Mixed Groups 597
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7 Warfield Groups 599 Exercises (1)
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7 Warfield Groups 601 (i) A=F is to
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7 Warfield Groups 603 Lemma 7.7 (St
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8 The Categories WALK and WARF 605
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8 The Categories WALK and WARF 607
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9 Projective Properties of Warfield
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9 Projective Properties of Warfield
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Chapter 16 Endomorphism Rings Abstr
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1 Endomorphism Rings 615 Lemma 1.5.
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1 Endomorphism Rings 617 For a subg
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1 Endomorphism Rings 619 Before sta
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1 Endomorphism Rings 621 Recently,
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2 Endomorphism Rings of p-Groups 62
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3 Endomorphism Rings of Torsion-Fre
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4 Endomorphism Rings of Special Gro
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5 Special Endomorphism Rings 637 se
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5 Special Endomorphism Rings 639 Pr
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5 Special Endomorphism Rings 641 Re
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6 Groups as Modules Over Their Endo
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7 Groups with Prescribed Endomorphi
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7 Groups with Prescribed Endomorphi
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656 17 Automorphism Groups Example
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658 17 Automorphism Groups linear g
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660 17 Automorphism Groups Exercise
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662 17 Automorphism Groups Accordin
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Page 706 and 707: 5 Additive Groups of Regular Rings
Page 708 and 709: 6 E-Rings 693 (2) A group is isomor
Page 710 and 711: 6 E-Rings 695 (F) Every endomorphis
Page 712 and 713: 7 Groups of Units in Commutative Ri
Page 714 and 715: 7 Groups of Units in Commutative Ri
Page 716 and 717: 8 Multiplicative Groups of Fields 7
Page 722 and 723: References Books D.M. Arnold — [A
Page 724 and 725: References 709 D.M. Arnold, R. Hunt
Page 726 and 727: References 711 R. Burkhardt — [1]
Page 728 and 729: References 713 M. Dugas — [1] Fas
Page 732 and 733: References 717 R. Göbel, S. Shelah
Page 734 and 735: References 719 P. Hill, M. Lane, C.
Page 736 and 737: References 721 A. Kertész — [1]
Page 738 and 739: References 723 A. Mader — [1] On
Page 740 and 741: References 725 L.G. Nongxa — [1]
Page 742 and 743: References 727 endomorphism rings.
Page 744 and 745: References 729 G.M. Tsukerman — [
Page 746 and 747: Author Index A Abel, N.H., vii Albr
Page 748 and 749: Author Index 733 Grinshpon, S.Ya.,
Page 750 and 751: Author Index 735 O’Neill, J.D., 3
Page 752 and 753: Subject Index A Abelian group, 1 Ab
Page 754 and 755: Subject Index 739 homomorphism, 37,
Page 756 and 757: Subject Index 741 Full rational gro
Page 758 and 759: Subject Index 743 Łoś-Eda theorem
Page 760 and 761: Subject Index 745 Rank 1 torsion-fr
Page 762: Subject Index 747 vector space, 334
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Abelian Groups - László Fuchs [Springer]

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