2010, ISBN: 9789048147380

[ED: Softcover], [PU: Springer / Springer Netherlands], In Commutative Algebra certain /-adic filtrations of Noetherian rings, i.e. the so-called Zariski rings, are at the basis of singularity theory. Apart from that it is mainly in the context of Homological Algebra that filtered rings and the associated graded rings are being studied not in the least because of the importance of double complexes and their spectral sequences. Where non-commutative algebra is concerned, applications of the theory of filtrations were mainly restricted to the study of enveloping algebras of Lie algebras and, more extensively even, to the study of rings of differential operators. It is clear that the operation of completion at a filtration has an algebraic genotype but a topological fenotype and it is exactly the symbiosis of Algebra and Topology that works so well in the commutative case, e.g. ideles and adeles in number theory or the theory of local fields, Puisseux series etc, .... . In Non commutative algebra the bridge between Algebra and Analysis is much more narrow and it seems that many analytic techniques of the non-commutative kind are still to be developed. Nevertheless there is the magnificent example of the analytic theory of rings of differential operators and 1J-modules a la Kashiwara-Shapira. Softcover reprint of the original 1st ed. 1996. 2010. IX, 253 S. Literaturverz. 23. Versandfertig in 6-10 Tagen, DE, [SC: 0.00], Neuware, gewerbliches Angebot, Offene Rechnung (Vorkasse vorbehalten)

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2010, ISBN: 9789048147380

[ED: Softcover], [PU: Springer Netherlands], In Commutative Algebra certain /-adic filtrations of Noetherian rings, i.e. the so-called Zariski rings, are at the basis of singularity theory. Apart from that it is mainly in the context of Homological Algebra that filtered rings and the associated graded rings are being studied not in the least because of the importance of double complexes and their spectral sequences. Where non-commutative algebra is concerned, applications of the theory of filtrations were mainly restricted to the study of enveloping algebras of Lie algebras and, more extensively even, to the study of rings of differential operators. It is clear that the operation of completion at a filtration has an algebraic genotype but a topological fenotype and it is exactly the symbiosis of Algebra and Topology that works so well in the commutative case, e.g. ideles and adeles in number theory or the theory of local fields, Puisseux series etc, .... . In Non commutative algebra the bridge between Algebra and Analysis is much more narrow and it seems that many analytic techniques of the non-commutative kind are still to be developed. Nevertheless there is the magnificent example of the analytic theory of rings of differential operators and 1J-modules a la Kashiwara-Shapira. Softcover reprint of the original 1st ed. 1996. 2010. ix, 253 S. 1 SW-Abb.,. 235 mm Versandfertig in 6-10 Tagen, DE, [SC: 0.00], Neuware, gewerbliches Angebot, Offene Rechnung (Vorkasse vorbehalten)

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2010, ISBN: 9048147387

[EAN: 9789048147380], Neubuch, [SC: 0.0], [PU: Springer Netherlands], GRAD; HOMOLOGICALALGEBRA; ALGEBRA; ASSOCIATIVERING; COMMUTATIVEALGEBRA; RINGTHEORY, Druck auf Anfrage Neuware - In Commutative Algebra certain /-adic filtrations of Noetherian rings, i.e. the so-called Zariski rings, are at the basis of singularity theory. Apart from that it is mainly in the context of Homological Algebra that filtered rings and the associated graded rings are being studied not in the least because of the importance of double complexes and their spectral sequences. Where non-commutative algebra is concerned, applications of the theory of filtrations were mainly restricted to the study of enveloping algebras of Lie algebras and, more extensively even, to the study of rings of differential operators. It is clear that the operation of completion at a filtration has an algebraic genotype but a topological fenotype and it is exactly the symbiosis of Algebra and Topology that works so well in the commutative case, e.g. ideles and adeles in number theory or the theory of local fields, Puisseux series etc, . . In Non commutative algebra the bridge between Algebra and Analysis is much more narrow and it seems that many analytic techniques of the non-commutative kind are still to be developed. Nevertheless there is the magnificent example of the analytic theory of rings of differential operators and 1J-modules a la Kashiwara-Shapira. 268 pp. Englisch, Books

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2010, ISBN: 9789048147380

In Commutative Algebra certain /-adic filtrations of Noetherian rings, i.e. the so-called Zariski rings, are at the basis of singularity theory. Apart from that it is mainly in the context of Homological Algebra that filtered rings and the associated graded rings are being studied not in the least because of the importance of double complexes and their spectral sequences. Where non-commutative algebra is concerned, applications of the theory of filtrations were mainly restricted to the study of enveloping algebras of Lie algebras and, more extensively even, to the study of rings of differential operators. It is clear that the operation of completion at a filtration has an algebraic genotype but a topological fenotype and it is exactly the symbiosis of Algebra and Topology that works so well in the commutative case, e.g. ideles and adeles in number theory or the theory of local fields, Puisseux series etc, .... . In Non commutative algebra the bridge between Algebra and Analysis is much more narrow and it seems that many analytic techniques of the non-commutative kind are still to be developed. Nevertheless there is the magnificent example of the analytic theory of rings of differential operators and 1J-modules a la Kashiwara-Shapira. Buch (fremdspr.) Li Huishi#Freddy Van Oystaeyen Taschenbuch, Springer Netherland, 15.12.2010, Springer Netherland, 2010

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ISBN: 9789048147380

In Commutative Algebra certain /-adic filtrations of Noetherian rings, i.e. the so-called Zariski rings, are at the basis of singularity theory. Apart from that it is mainly in the context of Homological Algebra that filtered rings and the associated graded rings are being studied not in the least because of the importance of double complexes and their spectral sequences. Where non-commutative algebra is concerned, applications of the theory of filtrations were mainly restricted to the study of enveloping algebras of Lie algebras and, more extensively even, to the study of rings of differential operators. It is clear that the operation of completion at a filtration has an algebraic genotype but a topological fenotype and it is exactly the symbiosis of Algebra and Topology that works so well in the commutative case, e.g. ideles and adeles in number theory or the theory of local fields, Puisseux series etc, .... . In Non commutative algebra the bridge between Algebra and Analysis is much more narrow and it seems that many analytic techniques of the non-commutative kind are still to be developed. Nevertheless there is the magnificent example of the analytic theory of rings of differential operators and 1J-modules a la Kashiwara-Shapira. Books > Science & Nature > Math & Physics > Mathematics List_Books

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2010, ISBN: 9789048147380

[ED: Softcover], [PU: Springer / Springer Netherlands], In Commutative Algebra certain /-adic filtrations of Noetherian rings, i.e. the so-called Zariski rings, are at the basis of singul… Meer...

2010, ISBN: 9789048147380

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2010

## ISBN: 9048147387

[EAN: 9789048147380], Neubuch, [SC: 0.0], [PU: Springer Netherlands], GRAD; HOMOLOGICALALGEBRA; ALGEBRA; ASSOCIATIVERING; COMMUTATIVEALGEBRA; RINGTHEORY, Druck auf Anfrage Neuware - In Co… Meer...

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2010, ISBN: 9789048147380

In Commutative Algebra certain /-adic filtrations of Noetherian rings, i.e. the so-called Zariski rings, are at the basis of singularity theory. Apart from that it is mainly in the contex… Meer...

ISBN: 9789048147380

In Commutative Algebra certain /-adic filtrations of Noetherian rings, i.e. the so-called Zariski rings, are at the basis of singularity theory. Apart from that it is mainly in the contex… Meer...

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** Gedetalleerde informatie over het boek. - Zariskian Filtrations**

EAN (ISBN-13): 9789048147380

ISBN (ISBN-10): 9048147387

Gebonden uitgave

pocket book

Verschijningsjaar: 2010

Uitgever: Springer-Verlag GmbH

264 Bladzijden

Gewicht: 0,404 kg

Taal: eng/Englisch

Boek bevindt zich in het datenbestand sinds 2012-11-06T11:22:57+01:00 (Amsterdam)

Detailpagina laatst gewijzigd op 2021-12-01T01:33:38+01:00 (Amsterdam)

ISBN/EAN: 9789048147380

ISBN - alternatieve schrijfwijzen:

90-481-4738-7, 978-90-481-4738-0

### Gegevens van de uitgever

Auteur: Li Huishi; Freddy Van Oystaeyen

Titel: K-Monographs in Mathematics; Zariskian Filtrations

Uitgeverij: Springer; Springer Netherland

253 Bladzijden

Verschijningsjaar: 2010-12-15

Dordrecht; NL

Gedrukt / Gemaakt in

Gewicht: 0,454 kg

Taal: Engels

106,99 € (DE)

109,99 € (AT)

118,00 CHF (CH)

POD

BC; Previously published in hardcover; Hardcover, Softcover / Mathematik/Arithmetik, Algebra; Algebra; Verstehen; Grad; Homological algebra; algebra; associative ring; commutative algebra; ring theory; partial differential equations; B; Associative Rings and Algebras; Category Theory, Homological Algebra; Algebraic Geometry; Partial Differential Equations; Elementary Particles, Quantum Field Theory; Associative Rings and Algebras; Category Theory, Homological Algebra; Algebraic Geometry; Differential Equations; Elementary Particles, Quantum Field Theory; Mathematics and Statistics; Mathematische Grundlagen; Algebra; Algebraische Geometrie; Differentialrechnung und -gleichungen; Quantenphysik (Quantenmechanik und Quantenfeldtheorie); BB

Introduction. I. Filtered Rings and Modules. II. Zariskian Filtrations. III. Auslander Regular Filtered (Graded) Rings. IV. Microlocalization of Filtered Rings and Modules, Quantum Sections and Gauge Algebras. References. Subject Index.### Andere boeken die eventueel grote overeenkomsten met dit boek kunnen hebben:

### Laatste soortgelijke boek:

*9780792341840 Zariskian Filtrations (Li Huishi; Freddy Van Oystaeyen)*

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