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|a 1052782971
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|a QA177
|b .B47 2018
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|a 512/.23
|2 23
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|a UAMI
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|a Berkovich, Yakov G.
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|a Yakov Berkovich; Zvonimir Janko.
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|a Berlin/Boston :
|b De Gruyter, Inc.,
|c 2018.
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|a 1 online resource (410 pages)
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|a text
|b txt
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|a De Gruyter Expositions in Mathematics Ser. ;
|v v. 65
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|a Print version record.
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|6 880-01
|a Intro; Contents; List of definitions and notations; Preface; 257 Nonabelian p-groups with exactly one minimal nonabelian subgroup of exponent> p; 258 2-groups with some prescribed minimal nonabelian subgroups; 259 Nonabelian p-groups, p> 2, all of whose minimal nonabelian subgroups are isomorphic to Mp3; 260 p-groups with many modular subgroups Mpn; 261 Nonabelian p-groups of exponent> p with a small number of maximal abelian subgroups of exponent> p; 262 Nonabelian p-groups all of whose subgroups are powerful.
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|a 270 p-groups all of whose Ak-subgroups for a fixed k> 1 are metacyclic 271 Two theorems of Blackburn; 272 Nonabelian p-groups all of whose maximal abelian subgroups, except one, are either cyclic or elementary abelian; 273 Nonabelian p-groups all of whose noncyclic maximal abelian subgroups are elementary abelian; 274 Non-Dedekindian p-groups in which any two nonnormal subgroups normalize each other; 275 Nonabelian p-groups with exactly p normal closures of minimal nonabelian subgroups; 276 2-groups all of whose maximal subgroups, except one, are Dedekindian.
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|a 277 p-groups with exactly two conjugate classes of nonnormal maximal cyclic subgroups 278 Nonmetacyclic p-groups all of whose maximal metacyclic subgroups have index p; 279 Subgroup characterization of some p-groups of maximal class and close to them; 280 Nonabelian p-groups all of whose maximal subgroups, except one, are minimal nonmetacyclic; 281 Nonabelian p-groups in which any two distinct minimal nonabelian subgroups have a cyclic intersection; 282 p-groups with large normal closures of nonnormal subgroups; 283 Nonabelian p-groups with many cyclic centralizers.
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|a 284 Nonabelian p-groups, p> 2, of exponent> p2 all of whose minimal nonabelian subgroups are of order p3 285 A generalization of Lemma 57.1; 286 Groups ofexponent p with many normal subgroups; 287 p-groups in which the intersection of any two nonincident subgroups is normal; 288 Nonabelian p-groups in which for every minimal nonabelian M M(x) = Z(M); 289 Non-Dedekindian p-groups all of whose maximal nonnormal subgroups are conjugate.
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|a 290 Non-Dedekindian p-groups G with a noncyclic proper subgroup H such that each subgroup which is nonincident with H is normal in G.
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|a eBooks on EBSCOhost
|b EBSCO eBook Subscription Academic Collection - Worldwide
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590 |
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|a ProQuest Ebook Central
|b Ebook Central Academic Complete
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650 |
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|a Finite groups.
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650 |
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|a Group theory.
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650 |
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6 |
|a Groupes finis.
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650 |
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6 |
|a Théorie des groupes.
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|a Finite groups
|2 fast
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650 |
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|a Group theory
|2 fast
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700 |
1 |
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|a Janko, Zvonimir.
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776 |
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|i Print version:
|a Berkovich, Yakov G.
|t Yakov Berkovich; Zvonimir Janko: Groups of Prime Power Order. Volume 6.
|d Berlin/Boston : De Gruyter, Inc., ©2018
|z 9783110530971
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830 |
|
0 |
|a De Gruyter Expositions in Mathematics Ser.
|
856 |
4 |
0 |
|u https://ebookcentral.uam.elogim.com/lib/uam-ebooks/detail.action?docID=5516054
|z Texto completo
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880 |
8 |
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|6 505-01/(S
|a 263 Nonabelian 2-groups G with CG(x) ≤ H for all H ∈ Γ1 and x ∈ H − Z(G) 264 Nonabelian 2-groups of exponent ≥ 16 all of whose minimal nonabelian subgroups, except one, have order 8; 265 p-groups all of whose regular subgroups are either absolutely regular or of exponent p; 266 Nonabelian p-groups in which any two distinct minimal nonabelian subgroups with a nontrivial intersection are non-isomorphic; 267 Thompson's A × B lemma; 268 On automorphisms of some p-groups; 269 On critical subgroups of p-groups.
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|a ProQuest Ebook Central
|b EBLB
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|a YBP Library Services
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