Abelian Groups - László Fuchs [Springer]

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References 729 G.M. Tsukerman — [1] Rings of endomorphisms of free modules [Russian]. Sibirsk. Mat. ˘Z. 7, 1161–1167 (1966) M. Turgi — [1] A sheaf-theoretical interpretation of the Kurosh theorem, in Abelian Group Theory. Lecture Notes in Mathematics, vol. 616 (Springer, Berlin, 1977), pp. 173–196 M.A. Turmanov — [1] On pureness in abelian groups. J. Sci. Math. 137, 5336–5345 (2006) H. Ulm — [1] Zur Theorie der abzählbar-unendlichen abelschen Gruppen. Math. Ann. 107, 774–803 (1933) C. Vinsonhaler — [1] Torsion-free abelian groups quasi-projective over their endomorphism rings. II. Pac. J. Math. 74, 261–265 (1978); Pac. J. Math. 79, 564–565 (1979). — [2] E- rings and related structures, in Non-Noetherian commutative ring theory. Mathematics and its Applications, vol. 520 (Kluwer Academic, Dordrecht, 2000), pp. 387–402 C. Vinsonhaler, S. Wallutis, W.J. Wickless — [1] A class of B .2/ -groups. Commun. Algebra 33, 2025–2035 (2005) C. Vinsonhaler, W.J. Wickless — [1] Torsion-free abelian groups quasi-projective over their endomorphism rings. Pac. J. Math. 68, 527–535 (1977). — [2] The injective hull of a separable p-group as an E-module. J. Algebra 71, 32–39 (1981). — [3] Balanced projective and cobalanced injective torsion-free groups of finite rank. Acta Math. Acad. Sci. Hungar. 46, 217–225 (1985). — [4] Dualities for torsion-free abelian groups of finite rank. J. Algebra 128, 474–487 (1990) B. Wald — [1] On -products modulo -products, in Abelian Group Theory. Lecture Notes in Mathematics, vol. 1006 (Springer, Berlin, 1983), pp. 362–370 C.P. Walker — [1] Properties of Ext and quasi-splitting of abelian groups. Acta Math. Acad. Sci. Hungar. 15, 157–160 (1964). — [2] Relative homological algebra and abelian groups. Ill. J. Math. 10, 186–209 (1966). — [3] Projective classes of completely decomposable abelian groups. Arch. Math. 23, 581–588 (1972) E.A. Walker — [1] Cancellation in direct sums of groups. Proc. Am. Math. Soc. 7, 898–902 (1956). — [2] Quotient categories and quasi-isomorphisms of abelian groups, in Proceedings of the Colloquium on Abelian Groups (Akadémiai Kiadó, Budapest, 1964), pp. 147–162. — [3] Ulm’s theorem for totally projective groups. Proc. Am. Math. Soc. 37, 387–392 (1973). — [4] The groups Pˇ. Symposia Math. 13, 245–255 (1974) K.D. Wallace — [1] On mixed groups of torsion-free rank one with totally projective primary components. J. Algebra 17, 482–488 (1971) J.D. Waller — [1] Generalized torsion complete groups, in Studies on Abelian Groups (Dunod, Paris, 1968), pp. 345–356 R.B. Warfield, Jr. — [1] Homomorphisms and duality for torsion-free groups. Math. Z. 107, 189–200 (1968). — [2] A Krull-Schmidt theorem for infinite sums of modules. Proc. Am. Math. Soc. 22, 460–465 (1969). — [3] An isomorphic refinement theorem for abelian groups. Pac. J. Math. 34, 237–255 (1970). — [4] Simply presented groups, in Proceedings of the Special Semester on Abelian Groups (University of Arizona, Tucson, 1972). — [5] The uniqueness of elongations of abelian groups. Pac. J. Math. 52, 289–304 (1974). — [6] A classification theorem for abelian p-groups. Trans. Am. Math. Soc. 210, 149–168 (1975). — [7] Classification theory of abelian groups. I: Balanced projectives. Trans. Am. Math. Soc. 222, 33–63 (1976). II: Local theory, in Abelian Group Theory. Lecture Notes in Mathematics, vol. 874 (Springer, Berlin, 1981), pp. 322–349. — [8] The structure theory of mixed abelian groups, in Abelian Group Theory. Lecture Notes in Mathematics, vol. 616 (Springer, Berlin, 1977), pp. 1–38. — [9] Cancellation of modules and groups and stable range of endomorphism rings. Pac. J. Math. 91, 457–485 (1980) M.C. Webb — [1] The endomorphism ring of homogeneously decomposable separable groups. Arch. Math. 31, 235–243 (1978) B.D. Wick — [1] A projective characterization for SKT-modules. Proc. Am. Math. Soc. 80, 39–43 (1980). — [2] A classification theorem for SKT-modules. Proc. Am. Math. Soc. 80, 44–46 (1980) W.J. Wickless — [1] Abelian groups which admit only nilpotent multiplications. Pac. J. Math. 40, 251–259 (1972). — [2] T as an E-submodule of G. Pac. J. Math. 83, 555–564 (1979)
730 References G.V. Wilson — [1] Modules with the summand intersection property. Commun. Algebra 14, 21–38 (1986). K.G. Wolfson — [1] Baer rings of endomorphisms. Math. Ann. 143, 19–28 (1961). — [2] Isomorphisms of the endomorphism rings of a class of torsion-free modules. Proc. Am. Math. Soc. 14, 589–594 (1963) S.M. Yahya — [1] p-pure exact sequences and the group of p-pure extensions. Ann. Univ. Sci. Budapest 5, 179–191 (1962) A.V. Yakovlev — [1] Direct decompositions of torsion-free abelian groups of finite rank [Russian]. Zap. Nauchn. Sem. Leningr. Otdel. Mat. Inst. Steklov 160, 272–285 (1987); J. Sov. Math. 52, 3206–3216 (1990). — [2] Torsion-free abelian groups of finite rank and their direct decompositions [Russian]. Zap. Nauchn. Sem. Leningr. Otdel. Mat. Inst. Steklov. 175 (1989); Koltsa i Moduli 3, 135–153, 165; J. Sov. Math. 57, 3524–3533 (1991). — [3] Direct decompositions of mixed abelian groups [Russian]. Vestnik St. Petersburg Univ. Math. 43, 3–11 (2010) H. Yamabe — [1] A condition for an abelian group to be a free abelian group with a finite basis. Proc. Jpn. Acad. 77, 205–207 (1951) P.D. Yom — [1] A characterization of a class of Butler groups. I. Commun. Algebra 25, 3721–3734 (1997); II: Abelian Group Theory and Related Topics, Contemporary Mathematics, vol. 171 (American Mathematical Society, Providence, RI, 1994), pp. 419–432 H. Zassenhaus — [1] Orders as endomorphism rings of modules of the same rank. J. Lond. Math. Soc. 42, 180–182 (1967) E.C. Zeeman — [1] On direct sums of free cycles. J. Lond. Math. Soc. 30, 195–212 (1955) B. Zimmermann-Huisgen — [1] On Fuchs’ Problem 76. J. Reine Angew. Math. 309, 86–91 (1979) B. Zimmermann-Huisgen, W. Zimmermann — [1] Algebraically compact rings and modules. Math. Z. 61, 81–93 (1978) L. Zippin — [1] Countable torsion groups. Ann. Math. 36, 86–99 (1935) F. Zorzitto — [1] Discretely normed abelian groups. Aequationes Math. 29, 172–174 (1985)
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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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664 17 Automorphism Groups (2) If A
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666 17 Automorphism Groups (b) If G
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668 17 Automorphism Groups Then a 7
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670 17 Automorphism Groups for all
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Chapter 18 Groups in Rings and in F
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1 Additive Groups of Rings and Modu
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2 Rings on Groups 677 (11) For a ri
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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 730 and 731: References 715 A.A. Fomin — [1] T
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 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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