Yevhen Zelenyuk:Ultrafilters and Topologies on Groups
- Livro de bolso 2011, ISBN: 3110204223
[EAN: 9783110204223], Neubuch, [SC: 0.0], [PU: De Gruyter], ALGEBRA / GRUPPE (MATHEMATISCH); (MATHEMATISCH) - GRUPPENTHEORIE; TOPOLOGIE DIFFERENZIALTOPOLOGIE; TOPOLOGIE; SEMIGROUP; ULTRAF… mais…
[EAN: 9783110204223], Neubuch, [SC: 0.0], [PU: De Gruyter], ALGEBRA / GRUPPE (MATHEMATISCH); (MATHEMATISCH) - GRUPPENTHEORIE; TOPOLOGIE DIFFERENZIALTOPOLOGIE; TOPOLOGIE; SEMIGROUP; ULTRAFILTER; TOPOLOGY; FINITESEMIGROUP; ALMOSTMAXIMALSPACES, Druck auf Anfrage Neuware -This book presents the relationship between ultrafilters and topologies on groups. It shows how ultrafilters are used in constructing topologies on groups with extremal properties and how topologies on groups serve in deriving algebraic results about ultrafilters. The contents of the book fall naturally into three parts. The first, comprising Chapters 1 through 5, introduces to topological groups and ultrafilters insofar as the semigroup operation on ultrafilters is not required. Constructions of some important topological groups are given. In particular, that of an extremally disconnected topological group based on a Ramsey ultrafilter. Also one shows that every infinite group admits a nondiscrete zero-dimensional topology in which all translations and the inversion are continuous. In the second part, Chapters 6 through 9, the Stone-Cêch compactification G of a discrete group G is studied. For this, a special technique based on the concepts of a local left group and a local homomorphism is developed. One proves that if G is a countable torsion free group, then G contains no nontrivial finite groups. Also the ideal structure of G is investigated. In particular, one shows that for every infinite Abelian group G, G contains 22|G|minimal right ideals. In the third part, using the semigroup G, almost maximal topological and left topological groups are constructed and their ultrafilter semigroups are examined. Projectives in the category of finite semigroups are characterized. Also one shows that every infinite Abelian group with finitely many elements of order 2 is absolutely -resolvable, and consequently, can be partitioned into subsets such that every coset modulo infinite subgroup meets each subset of the partition. The book concludes with a list of open problems in the field. Some familiarity with set theory, algebra and topology is presupposed. But in general, the book is almost self-contained. It is aimed at graduate students and researchers working in topological algebra and adjacent areas. 228 pp. Englisch, Books<
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Yevhen Zelenyuk:Ultrafilters and Topologies on Groups
- nuovo livro 2017, ISBN: 9783110204223
[ED: Buch], [PU: De Gruyter], Neuware - This book presents the relationship between ultrafilters and topologies on groups. It shows how ultrafilters are used in constructing topologies on… mais…
[ED: Buch], [PU: De Gruyter], Neuware - This book presents the relationship between ultrafilters and topologies on groups. It shows how ultrafilters are used in constructing topologies on groups with extremal properties and how topologies on groups serve in deriving algebraic results about ultrafilters. The contents of the book fall naturally into three parts. The first, comprising Chapters 1 through 5, introduces to topological groups and ultrafilters insofar as the semigroup operation on ultrafilters is not required. Constructions of some important topological groups are given. In particular, that of an extremally disconnected topological group based on a Ramsey ultrafilter. Also one shows that every infinite group admits a nondiscrete zero-dimensional topology in which all translations and the inversion are continuous. In the second part, Chapters 6 through 9, the Stone-Cêch compactification G of a discrete group G is studied. For this, a special technique based on the concepts of a local left group and a local homomorphism is developed. One proves that if G is a countable torsion free group, then G contains no nontrivial finite groups. Also the ideal structure of G is investigated. In particular, one shows that for every infinite Abelian group G, G contains 22|G| minimal right ideals. In the third part, using the semigroup G, almost maximal topological and left topological groups are constructed and their ultrafilter semigroups are examined. Projectives in the category of finite semigroups are characterized. Also one shows that every infinite Abelian group with finitely many elements of order 2 is absolutely -resolvable, and consequently, can be partitioned into subsets such that every coset modulo infinite subgroup meets each subset of the partition. The book concludes with a list of open problems in the field. Some familiarity with set theory, algebra and topology is presupposed. But in general, the book is almost self-contained. It is aimed at graduate students and researchers working in topological algebra and adjacent areas.- Besorgungstitel - vorauss. Lieferzeit 3-5 Tage., DE, [SC: 2.70], Neuware, gewerbliches Angebot, 246x175x18 mm, 228, [GW: 573g], Banküberweisung, Offene Rechnung, Kreditkarte, PayPal, Offene Rechnung (Vorkasse vorbehalten), Internationaler Versand<
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Ultrafilters and Topologies on Groups by Yevhen Zelenyuk Hardcover | Indigo Chapters
- nuovo livroISBN: 9783110204223
This book presents the relationship between ultrafilters and topologies on groups. It shows how ultrafilters are used in constructing topologies on groups with extremal properties and how… mais…
This book presents the relationship between ultrafilters and topologies on groups. It shows how ultrafilters are used in constructing topologies on groups with extremal properties and how topologies on groups serve in deriving algebraic results about ultrafilters. The contents of the book fall naturally into three parts. The first, comprising Chapters 1 through 5, introduces to topological groups and ultrafilters insofar as the semigroup operation on ultrafilters is not required. Constructions of some important topological groups are given. In particular, that of an extremally disconnected topological group based on a Ramsey ultrafilter. Also one shows that every infinite group admits a nondiscrete zero-dimensional topology in which all translations and the inversion are continuous. In the second part, Chapters 6 through 9, the Stone-C ch compactification βG of a discrete group G is studied. For this, a special technique based on the concepts of a local left group and a local homomorphism is developed. One proves that if G is a countable torsion free group, then βG contains no nontrivial finite groups. Also the ideal structure of βG is investigated. In particular, one shows that for every infinite Abelian group G, βG contains 22-G-minimal right ideals. In the third part, using the semigroup βG, almost maximal topological and left topological groups are constructed and their ultrafilter semigroups are examined. Projectives in the category of finite semigroups are characterized. Also one shows that every infinite Abelian group with finitely many elements of order 2 is absolutely Ï?-resolvable, and consequently, can be partitioned into Ï? subsets such that every coset modulo infinite subgroup meets each subset of the partition. The book concludes with a list of open problems in the field. Some familiarity with set theory, algebra and topology is presupposed. But in general, the book is almost self-contained. It is aimed at graduate students and researchers working in topological algebra and adjacent areas. | Ultrafilters and Topologies on Groups by Yevhen Zelenyuk Hardcover | Indigo Chapters Books > Science & Nature > Math & Physics > Mathematics P10117, Yevhen Zelenyuk<
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Zelenyuk, Yevhen:Ultrafilters and Topologies on Groups
- encadernada, livro de bolso 2011, ISBN: 9783110204223
[ED: Hardcover], [PU: De Gruyter], This book presents the relationship between ultrafilters and topologies on groups. It shows how ultrafilters are used in constructing topologies on grou… mais…
[ED: Hardcover], [PU: De Gruyter], This book presents the relationship between ultrafilters and topologies on groups. It shows how ultrafilters are used in constructing topologies on groups with extremal properties and how topologies on groups serve in deriving algebraic results about ultrafilters.The contents of the book fall naturally into three parts. The first, comprising Chapters 1 through 5, introduces to topological groups and ultrafilters insofar as the semigroup operation on ultrafilters is not required. Constructions of some important topological groups are given. In particular, that of an extremally disconnected topological group based on a Ramsey ultrafilter. Also one shows that every infinite group admits a nondiscrete zero-dimensional topology in which all translations and the inversion are continuous.In the second part, Chapters 6 through 9, the Stone-Cêch compactification G of a discrete group G is studied. For this, a special technique based on the concepts of a local left group and a local homomorphism is developed. One proves that if G is a countable torsion free group, then G contains no nontrivial finite groups. Also the ideal structure of G is investigated. In particular, one shows that for every infinite Abelian group G, G contains 22 G minimal right ideals.In the third part, using the semigroup G, almost maximal topological and left topological groups are constructed and their ultrafilter semigroups are examined. Projectives in the category of finite semigroups are characterized. Also one shows that every infinite Abelian group with finitely many elements of order 2 is absolutely -resolvable, and consequently, can be partitioned into subsets such that every coset modulo infinite subgroup meets each subset of the partition.The book concludes with a list of open problems in the field. Some familiarity with set theory, algebra and topology is presupposed. But in general, the book is almost self-contained. It is aimed at graduate students and researchers working in topological algebra and adjacent areas.
2011. VIII, 219 S.
Versandfertig in 6-10 Tagen, DE, [SC: 0.00], Neuware, gewerbliches Angebot, Offene Rechnung (Vorkasse vorbehalten)<
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Zelenyuk, Yevhen:Ultrafilters and Topologies on Groups
- encadernada, livro de bolso 2011, ISBN: 3110204223
Gebundene Ausgabe Algebra / Gruppe (mathematisch), Gruppe (mathematisch) - Gruppentheorie, Topologie - Differenzialtopologie, Gruppen und Gruppentheorie, Zahlentheorie, Algebraische Topo… mais…
Gebundene Ausgabe Algebra / Gruppe (mathematisch), Gruppe (mathematisch) - Gruppentheorie, Topologie - Differenzialtopologie, Gruppen und Gruppentheorie, Zahlentheorie, Algebraische Topologie, Gruppentheorie; Topologie; semigroup; Ultrafilter; FiniteSemigroup; AlmostMaximalSpaces; Topology, mit Schutzumschlag 11, [PU:De Gruyter]<
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