Abelian Groups - László Fuchs [Springer]

More documents

Recommendations

Info

References 719 P. Hill, M. Lane, C. Megibben — [1] On the structure of p-local abelian groups. J. Algebra 143, 29–45 (1991) P. Hill, C. Megibben — [1] Minimal pure subgroups in abelian groups. Bull. Soc. Math. France 92, 251–257 (1964). — [2] Quasi-closed primary groups. Acta Math. Acad. Sci. Hungar. 16, 271–274 (1965). — [3] On primary groups with countable basic subgroups. Trans. Am. Math. Soc. 124, 49–59 (1966). — [4] Extending automorphisms and lifting decompositions in abelian groups. Math. Ann. 175, 159–168 (1968). — [5] On direct sums of countable groups and generalizations, in Studies in Abelian Groups (Dunod, Paris, 1968), pp. 183–206. — [6] On the theory and classification of abelian p-groups. Math. Z. 190, 17–38 (1985). — [7] Torsion-free groups. Trans. Am. Math. Soc. 295, 735–751 (1986). — [8] The local equivalence theorem, in Abelian Group Theory, Contemporary Mathematics, vol. 87 (American Mathematical Society, Providence, RI, 1989), pp. 201–219. — [9] Mixed groups. Trans. Am. Math. Soc. 334, 121–142 (1992). — [10] The classification of certain Butler groups. J. Algebra 160, 524–551 (1993). P. Hill, C. Megibben, W. Ullery — [1] Every endomorphism of a local Warfield module is the sum of two automorphisms, in Abelian Groups, Rings, Modules and Homological Algebra. Lecture Notes in Pure and Applied Mathematics, vol. 249 (Chapman & Hall, London, 2006), pp. 175–181 P. Hill, W. Ullery — [1] Isotype subgroups of local Warfield groups. Commun. Algebra 29, 1899–1907 (2001) H.L. Hiller, M. Huber, S. Shelah — [1] The structure of Ext.A; Z/ and V = L. Math. Z. 162, 39–50 (1978) K.Y. Honda — [1] On primary groups. Comment. Math. Univ. St. Pauli 2, 71–83 (1954). — [2] On a decomposition theorem of primary groups. Comment. Math. Univ. St. Pauli 4, 53–66 (1955). — [3] Realism in the theory of abelian groups. Comment. Math. Univ. St. Pauli 5, 37–75 (1956); Math. Univ. St. Pauli 9, 11–28 (1961); Math. Univ. St. Pauli 12, 75–111 (1964) M. Huber — [1] On cartesian powers of a rational group. Math. Z. 169, 253–259 (1979). — [2] On reflexive modules and abelian groups. J. Algebra 82, 469–487 (1983) M. Huber, R.B. Warfield Jr. — [1] On the values of the functor lim 1 .Arch.Math.33, 430–436 (1979/80) A. Hulanicki — [1] Algebraic structure of compact abelian groups. Bull. Acad. Polon. Sci. Cl. III 6, 71–73 (1958). — [2] Note on a paper of de Groot. Proc. Ned. Akad. Wetensch. 61, 114 (1958). — [3] The structure of the factor group of an unrestricted sum by the restricted sum of abelian groups. Bull. Acad. Polon. Sci. Cl. III 10, 77–80 (1962) R.H. Hunter — [1] Balanced subgroups of abelian groups. Trans. Am. Math. Soc. 215, 81–89 (1976) R.H. Hunter, F. Richman — [1] Global Warfield groups. Trans. Am. Math. Soc. 266, 555–572 (1981) R.H. Hunter, F. Richman, E. Walker — [1] Simply presented valuated abelian p-groups. J. Algebra 49, 125–133 (1977). — [2] Existence theorems for Warfield groups. Trans. Am. Math. Soc. 235, 345–362 (1978). — [3] Ulm’s theorem for simply presented valuated p-groups, in Abelian Group Theory (Gordon and Breach, New York, 1987), pp. 33–64 D. van Huynh — [1] Die Spaltbarkeit von MHP-Ringen. Bull. Acad. Polon. Sci. Cl. III, 25, 939–941 (1977) J. Irwin, J. O’Neill — [1] On direct products of abelian groups. Can. J. Math. 22, 525–544 (1970) J.M. Irwin, F. Richman, E.A. Walker — [1] Countable direct sums of torsion complete groups. Proc. Am. Math. Soc. 17, 763–766 (1966) J. Irwin, T. Snabb — [1] A new class of subgroups of Q @ 0 Z,inAbelian Group Theory. Lecture Notes in Mathematics, vol. 874 (Springer, Berlin, 1981), pp. 154–160 J.M.Irwin,C.Walker,E.A.Walker—[1]Onp˛-pure sequences of abelian groups, in Topics in Abelian Groups (Chicago, 1963), Scott, Foresman & Co. pp. 69–119 J.M. Irwin, E.A. Walker — [1] On N-high subgroups of abelian groups. Pac. J. Math. 11, 1363–1374 (1961). — [2] On isotype subgroups of abelian groups. Bull. Soc. Math. France 89, 451–460 (1961)
720 References A.V. Ivanov — [1] A problem on abelian groups [Russian]. Mat. Sbornik 105(4), 525–542 (1978); Mat. USSR Sbornik 34, 461–474 (1978). — [2] Countable direct sums of complete and torsioncomplete groups [Russian]. Trudy Moskov. Mat. Obshch. 40, 121–170 (1979). — [3] Direct sums and complete direct sums of abelian groups [Russian], in Abelian Groups and Modules (Tomsk. Gos. Univ., Tomsk, 1980), pp. 70–90. — [4] Countable direct sums of certain groups [Russian]. Trudy Moskov. Mat. Obshch. 41, 217–240 (1980). — [5] A class of abelian groups [Russian]. Mat. Zametki 29, 351–358 (1981); Math. Notes 29, 182–185 (1981). — [6] Abelian groups with self-injective rings of endomorphisms and with rings of endomorphisms with the annihilator condition [Russian], in Abelian Groups and Modules (Tomsk. Gos. Univ., Tomsk, 1981), pp. 93–109. — [7] On a test problem of Kaplansky [Russian]. Trudy Moskov. Mat. Obshch. 42, 200–220 (1981); Trans. Moscow Math. Soc. 199–218 (1982) D.R. Jackett — [1] Some topics in the theory of ring structures on abelian groups. Bull. Aust. Math. Soc. 18, 155–156 (1978). — [2] Rings on certain mixed abelian groups. Pac. J. Math. 98, 365–373 (1982) C. Jacoby, K. Leistner, P. Loth, L. Strüngmann — [1] Abelian groups with partial decomposition bases in L ı 1! ,PartI,inGroups and Model Theory, Contemporary Mathematics, vol. 576 (American Mathematical Society, Providence, RI, 2012), pp. 163–175 S. Janakiraman, K.M. Rangaswamy — [1] Strongly pure subgroups of abelian groups, in Group Theory. Lecture Notes in Mathematics, vol. 573 (Springer, Berlin, 1976), pp. 57–65 C.U. Jensen — [1] On Ext.A; R/ for torsion-free A. Bull. Am. Math. Soc. 78, 831–834 (1972) L. Jeśmanowicz — [1] On direct decompositions of torsion-free abelian groups. Bull. Acad. Polon. Sci. Cl. III 8, 505–510 (1960) B. Jónsson — [1] Unique factorization problem for torsionfree abelian groups. Bull. Am. Math. Soc. 51, 364 (1945). — [2] On direct decomposition of torsion free abelian groups. Math. Scand. 5, 230–235 (1957); and 7, 361–371 (1959) F.F. Kamalov — [1] Intersection of direct summands of torsion-free abelian groups. Izv. Vyssh. Uchebn. Zaved. Mat. 5, 45–56 (1977). I. Kaplansky — [1] Some results on abelian groups. Proc. Nat. Acad. Sci. USA 38, 538–540 (1952). — [2] Projective modules. Ann. Math. 68, 372–377 (1958) I. Kaplansky, G.W. Mackey — [1] A generalization of Ulm’s theorem. Summa Brasil. Math. 2, 195–202 (1951) A.V. Karpenko, V.M. Misyakov — [1] On the regularity of the center of the endomorphism ring of an abelian group [Russian]. Fundam. Prikl. Mat. 13(3), 39–44 (2007); J. Math. Sci. 154, 304–307 (2008) L. Kaup, M.S. Kleane — [1] Induktive Limiten endlich erzeugter freier Moduln. Manuscripta Math. 1, 9–21 (1969) P.F. Keef — [1] On set theory and the balanced-projective dimension of C -groups, in Abelian Group Theory, Contemporary Mathematics, vol. 87 (American Mathematical Society, Providence, RI, 1989), pp. 31–42. — [2] On iterated torsion products of abelian p-groups. Rocky Mt. J. Math. 21, 1035–55 (1991). — [3] On products of primary abelian groups. J. Algebra 152, 116–134 (1992). — [4] A class of primary abelian groups characterized by its socles. Proc. Am. Math. Soc. 115 (1992), no. 3, 647–653. — [5] Extending homomorphisms on the socles of primary abelian groups. Commun. Algebra 21, 3439–53 (1993). — [6] Primary abelian groups admitting only small homomorphisms. Commun. Algebra 23, 3615–26 (1995). — [7] Representable preradicals with enough projectives, in Abelian Groups and Modules (Kluwer Academic Publishers, Dordrecht, 1995), pp. 301–311. — [8] Abelian groups and the torsion product, in Abelian Groups and Modules. Lecture Notes Pure Applied Mathematics, vol. 182 (Marcel Dekker, New York, 1996), pp. 45–66. — [9] Mahlo cardinals and the torsion product of primary abelian groups. Pac. J. Math. 259, 117–139 (2012) P.F. Keef, P.V. Danchev — [1] On n-simply presented primary abelian groups. Houst. J. Math. 38, 1027–1050 (2012) T. Kemoklidze — [1] On the full transitivity and fully invariant subgroups of cotorsion hulls of separable p-groups. J. Math. Sci. 153(4), 506–517 (2008); J. Math. Sci. 155(5), 748–786 (2008)
Page 1 and 2:
Springer Monographs in Mathematics
Page 4 and 5:
László Fuchs Abelian Groups 123
Page 6:
Dedicated with love to my wife Shul
Page 9 and 10:
viii Preface to relevant publicatio
Page 11 and 12:
x Preface on abelian groups. The re
Page 13 and 14:
xii Contents 4 Divisibility and Inj
Page 15 and 16:
xiv Contents 7 Whitehead Groups If
Page 18 and 19:
Table of Notations Set Theory ; : s
Page 20 and 21:
Table of Notations xix N .p/: Nunk
Page 22 and 23:
Table of Notations xxi Q A;;A : di
Page 24 and 25:
2 1 Fundamentals is finite, countab
Page 26 and 27:
4 1 Fundamentals Theorem 1.2. In a
Page 28 and 29:
6 1 Fundamentals (8) A superfluous
Page 30 and 31:
8 1 Fundamentals A ! A=K acting as
Page 32 and 33:
10 1 Fundamentals φ G ⏐ ↓ η 0
Page 34 and 35:
12 1 Fundamentals Lemma 2.5 (Snake
Page 36 and 37:
14 1 Fundamentals Exercises (1) Ass
Page 38 and 39:
16 1 Fundamentals non-zero subgroup
Page 40 and 41:
18 1 Fundamentals in Sect. 7 in Cha
Page 42 and 43:
20 1 Fundamentals 4 Sets Since the
Page 44 and 45:
22 1 Fundamentals It might be helpf
Page 46 and 47:
24 1 Fundamentals This is an amazin
Page 48 and 49:
26 1 Fundamentals of subgroups, ind
Page 50 and 51:
28 1 Fundamentals If is an infinit
Page 52 and 53:
30 1 Fundamentals For the proof of
Page 54 and 55:
32 1 Fundamentals C3. Identity. For
Page 56 and 57:
34 1 Fundamentals is exact in D; F
Page 58 and 59:
36 1 Fundamentals 7 Linear Topologi
Page 60 and 61:
38 1 Fundamentals Proof. (We need s
Page 62 and 63:
40 1 Fundamentals For two R-modules
Page 64 and 65:
Chapter 2 Direct Sums and Direct Pr
Page 66 and 67:
1 Direct Sums and Direct Products 4
Page 68 and 69:
Page 70 and 71:
Page 72 and 73:
2 Direct Summands 51 Proof. If A D
Page 74 and 75:
2 Direct Summands 53 Exercises (1)
Page 76 and 77:
3 Pull-Back and Push-Out Diagrams 5
Page 78 and 79:
4 Direct Limits 57 In this case, A
Page 80 and 81:
4 Direct Limits 59 We now move to t
Page 82 and 83:
5 Inverse Limits 61 for 0 W G ! A
Page 84 and 85:
5 Inverse Limits 63 for every i 2 I
Page 86 and 87:
6 Direct Products vs. Direct Sums 6
Page 88 and 89:
6 Direct Products vs. Direct Sums 6
Page 90 and 91:
7 Completeness in Linear Topologies
Page 92 and 93:
Page 94 and 95:
Page 96 and 97:
Chapter 3 Direct Sums of Cyclic Gro
Page 98 and 99:
1 Freeness and Projectivity 77 Coro
Page 100 and 101:
1 Freeness and Projectivity 79 Let
Page 102 and 103:
2 Finite and Finitely Generated Gro
Page 104 and 105:
Page 106 and 107:
Page 108 and 109:
3 Factorization of Finite Groups 87
Page 110 and 111:
3 Factorization of Finite Groups 89
Page 112 and 113:
4 Linear Independence and Rank 91 E
Page 114 and 115:
4 Linear Independence and Rank 93 t
Page 116 and 117:
5 Direct Sums of Cyclic Groups 95 P
Page 118 and 119:
5 Direct Sums of Cyclic Groups 97 s
Page 120 and 121:
6 Equivalent Presentations 99 (5) (
Page 122 and 123:
6 Equivalent Presentations 101 Thes
Page 124 and 125:
6 Equivalent Presentations 103 Equi
Page 126 and 127:
7 Chains of Free Groups 105 For Ded
Page 128 and 129:
7 Chains of Free Groups 107 We can
Page 130 and 131:
7 Chains of Free Groups 109 Hill’
Page 132 and 133:
7 Chains of Free Groups 111 which i
Page 134 and 135:
8 Almost Free Groups 113 (D) Let 0
Page 136 and 137:
8 Almost Free Groups 115 Proof. (a)
Page 138 and 139:
8 Almost Free Groups 117 be done by
Page 140 and 141:
8 Almost Free Groups 119 with. In t
Page 142 and 143:
9 Shelah’s Singular Compactness T
Page 144 and 145:
10 Groups with Discrete Norm 123 Di
Page 146 and 147:
10 Groups with Discrete Norm 125 Ch
Page 148 and 149:
11 Quasi-Projectivity 127 11 Quasi-
Page 150 and 151:
11 Quasi-Projectivity 129 for diffe
Page 152 and 153:
132 4 Divisibility and Injectivity
Page 154 and 155:
Page 156 and 157:
Page 158 and 159:
Page 160 and 161:
Page 162 and 163:
Page 164 and 165:
Page 166 and 167:
Page 168 and 169:
Page 170 and 171:
150 5 Purity and Basic Subgroups or
Page 172 and 173:
152 5 Purity and Basic Subgroups Pr
Page 174 and 175:
154 5 Purity and Basic Subgroups ge
Page 176 and 177:
Page 178 and 179:
158 5 Purity and Basic Subgroups Th
Page 180 and 181:
160 5 Purity and Basic Subgroups ˛
Page 182 and 183:
Page 184 and 185:
Page 186 and 187:
166 5 Purity and Basic Subgroups 5
Page 188 and 189:
168 5 Purity and Basic Subgroups Le
Page 190 and 191:
Page 192 and 193:
172 5 Purity and Basic Subgroups F
Page 194 and 195:
174 5 Purity and Basic Subgroups (H
Page 196 and 197:
176 5 Purity and Basic Subgroups Ma
Page 198 and 199:
Page 200 and 201:
180 5 Purity and Basic Subgroups So
Page 202 and 203:
Chapter 6 Algebraically Compact Gro
Page 204 and 205:
1 Algebraic Compactness 185 of the
Page 206 and 207:
1 Algebraic Compactness 187 Na j ;
Page 208 and 209:
1 Algebraic Compactness 189 Here jG
Page 210 and 211:
2 Complete Groups 191 is a Cauchy s
Page 212 and 213:
2 Complete Groups 193 A ⏐ μ A A
Page 214 and 215:
3 The Structure of Algebraically Co
Page 216 and 217:
3 The Structure of Algebraically Co
Page 218 and 219:
4 Pure-Injective Hulls 199 (2) The
Page 220 and 221:
4 Pure-Injective Hulls 201 subgroup
Page 222 and 223:
5 Locally Compact Groups 203 5 Loca
Page 224 and 225:
5 Locally Compact Groups 205 Theore
Page 226 and 227:
6 The Exchange Property 207 Evident
Page 228 and 229:
6 The Exchange Property 209 In the
Page 230 and 231:
6 The Exchange Property 211 to the
Page 232 and 233:
Chapter 7 Homomorphism Groups Abstr
Page 234 and 235:
1 Groups of Homomorphisms 215 (and
Page 236 and 237:
1 Groups of Homomorphisms 217 is an
Page 238 and 239:
1 Groups of Homomorphisms 219 F Not
Page 240 and 241:
2 Algebraically Compact Homomorphis
Page 242 and 243:
2 Algebraically Compact Homomorphis
Page 244 and 245:
3 Small Homomorphisms 225 (3) The a
Page 246 and 247:
3 Small Homomorphisms 227 completio
Page 248 and 249:
Chapter 8 Tensor and Torsion Produc
Page 250 and 251:
1 The Tensor Product 231 with the f
Page 252 and 253:
1 The Tensor Product 233 for matchi
Page 254 and 255:
1 The Tensor Product 235 finitely P
Page 256 and 257:
2 The Torsion Product 237 (6) (a) I
Page 258 and 259:
2 The Torsion Product 239 It is pre
Page 260 and 261:
2 The Torsion Product 241 It remain
Page 262 and 263:
3 Theorems on Tensor Products 243 T
Page 264 and 265:
4 Theorems on Torsion Products 245
Page 266 and 267:
Page 268 and 269:
Page 270 and 271:
5 Localization 251 (8) (Keef) If A
Page 272 and 273:
5 Localization 253 Exercises (1) If
Page 274 and 275:
256 9 Groups of Extensions and Coto
Page 276 and 277:
Page 278 and 279:
Page 280 and 281:
Page 282 and 283:
Page 284 and 285:
Page 286 and 287:
Page 288 and 289:
Page 290 and 291:
Page 292 and 293:
Page 294 and 295:
Page 296 and 297:
Page 298 and 299:
Page 300 and 301:
Page 302 and 303:
Page 304 and 305:
Page 306 and 307:
Page 308 and 309:
Page 310 and 311:
Page 312 and 313:
Page 314 and 315:
Page 316 and 317:
Page 318 and 319:
300 10 Torsion Groups (A) If C is a
Page 320 and 321:
302 10 Torsion Groups the indicator
Page 322 and 323:
304 10 Torsion Groups 0 −−−
Page 324 and 325:
306 10 Torsion Groups is tantamount
Page 326 and 327:
308 10 Torsion Groups Proof. We hav
Page 328 and 329:
310 10 Torsion Groups (3) Let A be
Page 330 and 331:
312 10 Torsion Groups (C) B is a ba
Page 332 and 333:
314 10 Torsion Groups pure-injectiv
Page 334 and 335:
316 10 Torsion Groups Theorem 3.11
Page 336 and 337:
318 10 Torsion Groups 4 More on Tor
Page 338 and 339:
320 10 Torsion Groups (g) The large
Page 340 and 341:
322 10 Torsion Groups that in torsi
Page 342 and 343:
324 10 Torsion Groups subgroup of B
Page 344 and 345:
326 10 Torsion Groups (c) Homomorph
Page 346 and 347:
328 10 Torsion Groups then Ker con
Page 348 and 349:
330 10 Torsion Groups A class more
Page 350 and 351:
332 10 Torsion Groups with basic su
Page 352 and 353:
334 10 Torsion Groups 8 Valuated Ve
Page 354 and 355:
336 10 Torsion Groups V D A ` B for
Page 356 and 357:
338 10 Torsion Groups Proof. Define
Page 358 and 359:
340 10 Torsion Groups When Socles D
Page 360 and 361:
342 10 Torsion Groups Hill [1] gave
Page 362 and 363:
344 11 p-Groups with Elements of In
Page 364 and 365:
Page 366 and 367:
Page 368 and 369:
Page 370 and 371:
Page 372 and 373:
Page 374 and 375:
Page 376 and 377:
Page 378 and 379:
Page 380 and 381:
Page 382 and 383:
Page 384 and 385:
Page 386 and 387:
Page 388 and 389:
Page 390 and 391:
Page 392 and 393:
Page 394 and 395:
Page 396 and 397:
Page 398 and 399:
Page 400 and 401:
Page 402 and 403:
Page 404 and 405:
Page 406 and 407:
Page 408 and 409:
Page 410 and 411:
Page 412 and 413:
Page 414 and 415:
Page 416 and 417:
Page 418 and 419:
Page 420 and 421:
Page 422 and 423:
Page 424 and 425:
Page 426 and 427:
Page 428 and 429:
410 12 Torsion-Free Groups is calle
Page 430 and 431:
412 12 Torsion-Free Groups Proof. L
Page 432 and 433:
414 12 Torsion-Free Groups If A is
Page 434 and 435:
416 12 Torsion-Free Groups Exercise
Page 436 and 437:
418 12 Torsion-Free Groups Converse
Page 438 and 439:
420 12 Torsion-Free Groups fa X j a
Page 440 and 441:
422 12 Torsion-Free Groups and 0 !
Page 442 and 443:
424 12 Torsion-Free Groups (ii) If
Page 444 and 445:
426 12 Torsion-Free Groups number o
Page 446 and 447:
428 12 Torsion-Free Groups along B
Page 448 and 449:
430 12 Torsion-Free Groups whenever
Page 450 and 451:
432 12 Torsion-Free Groups If we ha
Page 452 and 453:
434 12 Torsion-Free Groups Then we
Page 454 and 455:
436 12 Torsion-Free Groups (ii) For
Page 456 and 457:
438 12 Torsion-Free Groups (7) (de
Page 458 and 459:
440 12 Torsion-Free Groups it is ro
Page 460 and 461:
442 12 Torsion-Free Groups 1 for `
Page 462 and 463:
444 12 Torsion-Free Groups A D B i
Page 464 and 465:
446 12 Torsion-Free Groups (5) For
Page 466 and 467:
448 12 Torsion-Free Groups Proof. L
Page 468 and 469:
450 12 Torsion-Free Groups local (T
Page 470 and 471:
452 12 Torsion-Free Groups stable r
Page 472 and 473:
454 12 Torsion-Free Groups (3) (War
Page 474 and 475:
456 12 Torsion-Free Groups write x
Page 476 and 477:
458 12 Torsion-Free Groups For thos
Page 478 and 479:
460 12 Torsion-Free Groups A C 1
Page 480 and 481:
462 12 Torsion-Free Groups ˛./.˛
Page 482 and 483:
464 12 Torsion-Free Groups so the s
Page 484 and 485:
466 12 Torsion-Free Groups followed
Page 486 and 487:
468 12 Torsion-Free Groups (i) ther
Page 488 and 489:
470 12 Torsion-Free Groups 11 Duali
Page 490 and 491:
472 12 Torsion-Free Groups Lemma 11
Page 492 and 493:
474 12 Torsion-Free Groups rk p D.A
Page 494 and 495:
476 12 Torsion-Free Groups is proj(
Page 496 and 497:
478 12 Torsion-Free Groups division
Page 498 and 499:
Chapter 13 Torsion-Free Groups of I
Page 500 and 501:
1 Direct Decompositions of Infinite
Page 502 and 503:
Page 504 and 505:
Page 506 and 507:
2 Slender Groups 489 (6) A torsion-
Page 508 and 509:
2 Slender Groups 491 Example 2.5. T
Page 510 and 511:
2 Slender Groups 493 Proof. From Th
Page 512 and 513:
2 Slender Groups 495 F Notes. The r
Page 514 and 515:
3 Characterizations of Slender Grou
Page 516 and 517:
3 Characterizations of Slender Grou
Page 518 and 519:
4 Separable Groups 501 Exercises (1
Page 520 and 521:
4 Separable Groups 503 where the G
Page 522 and 523:
4 Separable Groups 505 In the follo
Page 524 and 525:
4 Separable Groups 507 c C g D h 2
Page 526 and 527:
5 Vector Groups 509 (7) Show that t
Page 528 and 529:
5 Vector Groups 511 Isomorphism of
Page 530 and 531:
6 Powers ofZ of Measurable Cardinal
Page 532 and 533:
Page 534 and 535:
Page 536 and 537:
7 Whitehead Groups If V = L 519 (7)
Page 538 and 539:
7 Whitehead Groups If V = L 521 Pro
Page 540 and 541:
7 Whitehead Groups If V = L 523 Sˇ
Page 542 and 543:
8 Whitehead Groups Under Martin’s
Page 544 and 545:
8 Whitehead Groups Under Martin’s
Page 546 and 547:
Chapter 14 Butler Groups Abstract T
Page 548 and 549:
1 Finite Rank Butler Groups 531 and
Page 550 and 551:
1 Finite Rank Butler Groups 533 Pro
Page 552 and 553:
1 Finite Rank Butler Groups 535 Let
Page 554 and 555:
2 Prebalanced and Decent Subgroups
Page 556 and 557:
2 Prebalanced and Decent Subgroups
Page 558 and 559:
3 The Torsion Extension Property 54
Page 560 and 561:
Page 562 and 563:
Page 564 and 565:
4 Countable Butler Groups 547 (ii)
Page 566 and 567:
5 B 1 -andB 2 -Groups 549 (F) Homog
Page 568 and 569:
6 Solid Subgroups 551 understand th
Page 570 and 571:
6 Solid Subgroups 553 fa n j n
Page 572 and 573:
6 Solid Subgroups 555 Again changin
Page 574 and 575:
7 Solid Chains 557 (4) A corank 1 s
Page 576 and 577:
7 Solid Chains 559 B C1 =B admits
Page 578 and 579:
7 Solid Chains 561 Lemma 7.6 (Bican
Page 580 and 581:
8 Butler Groups of Uncountable Rank
Page 582 and 583:
Page 584 and 585:
Page 586 and 587:
9 More on Infinite Butler Groups 56
Page 588 and 589:
9 More on Infinite Butler Groups 57
Page 590 and 591:
Chapter 15 Mixed Groups Abstract Mi
Page 592 and 593:
1 Splitting Mixed Groups 575 For ev
Page 594 and 595:
1 Splitting Mixed Groups 577 so A m
Page 596 and 597:
2 Baer Groups are Free 579 (4) (Opp
Page 598 and 599:
2 Baer Groups are Free 581 We note
Page 600 and 601:
2 Baer Groups are Free 583 One does
Page 602 and 603:
3 Valuated Groups. Height-Matrices
Page 604 and 605:
Page 606 and 607:
Page 608 and 609:
4 Nice, Isotype, and Balanced Subgr
Page 610 and 611:
5 Mixed Groups of Torsion-Free Rank
Page 612 and 613:
5 Mixed Groups of Torsion-Free Rank
Page 614 and 615:
6 Simply Presented Mixed Groups 597
Page 616 and 617:
7 Warfield Groups 599 Exercises (1)
Page 618 and 619:
7 Warfield Groups 601 (i) A=F is to
Page 620 and 621:
7 Warfield Groups 603 Lemma 7.7 (St
Page 622 and 623:
8 The Categories WALK and WARF 605
Page 624 and 625:
8 The Categories WALK and WARF 607
Page 626 and 627:
9 Projective Properties of Warfield
Page 628 and 629:
9 Projective Properties of Warfield
Page 630 and 631:
Chapter 16 Endomorphism Rings Abstr
Page 632 and 633:
1 Endomorphism Rings 615 Lemma 1.5.
Page 634 and 635:
1 Endomorphism Rings 617 For a subg
Page 636 and 637:
1 Endomorphism Rings 619 Before sta
Page 638 and 639:
1 Endomorphism Rings 621 Recently,
Page 640 and 641:
2 Endomorphism Rings of p-Groups 62
Page 642 and 643:
Page 644 and 645:
Page 646 and 647:
3 Endomorphism Rings of Torsion-Fre
Page 648 and 649:
Page 650 and 651:
Page 652 and 653:
4 Endomorphism Rings of Special Gro
Page 654 and 655:
5 Special Endomorphism Rings 637 se
Page 656 and 657:
5 Special Endomorphism Rings 639 Pr
Page 658 and 659:
5 Special Endomorphism Rings 641 Re
Page 660 and 661:
6 Groups as Modules Over Their Endo
Page 662 and 663:
Page 664 and 665:
Page 666 and 667:
Page 668 and 669:
7 Groups with Prescribed Endomorphi
Page 670 and 671:
7 Groups with Prescribed Endomorphi
Page 672 and 673:
656 17 Automorphism Groups Example
Page 674 and 675:
658 17 Automorphism Groups linear g
Page 676 and 677:
660 17 Automorphism Groups Exercise
Page 678 and 679:
662 17 Automorphism Groups Accordin
Page 680 and 681:
664 17 Automorphism Groups (2) If A
Page 682 and 683:
666 17 Automorphism Groups (b) If G
Page 684 and 685: 668 17 Automorphism Groups Then a 7
Page 686 and 687: 670 17 Automorphism Groups for all
Page 688 and 689: Chapter 18 Groups in Rings and in F
Page 690 and 691: 1 Additive Groups of Rings and Modu
Page 692 and 693: 2 Rings on Groups 677 (11) For a ri
Page 694 and 695: 2 Rings on Groups 679 is a subring,
Page 696 and 697: 2 Rings on Groups 681 Beaumont-Lawv
Page 698 and 699: 3 Additive Groups of Noetherian Rin
Page 700 and 701: 4 Additive Groups of Artinian Rings
Page 702 and 703: 4 Additive Groups of Artinian Rings
Page 704 and 705: 5 Additive Groups of Regular Rings
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 730 and 731: References 715 A.A. Fomin — [1] T
Page 732 and 733: References 717 R. Göbel, S. Shelah
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
show all

Abelian Groups - László Fuchs [Springer]

You also want an ePaper? Increase the reach of your titles

Delete template?

Save as template?