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200 1 $aBürgerliches Gesetzbuch für das Königreich Sachsen$enebst Publications-Verordnung vom 2 Januar 1863$emit ausführlichem, alphabetisch und chronologisch geordnetem Sach- und Wortregister, unter vergleichender Berücksischtigung der speciellen Motiven des Gesetzbuchs, sowie unter Aufnahme der dem heutigen Römischen Rechte angehörigen lateinischen Kunstausdrücke
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200 10$aFrom Rings and Modules to Hopf Algebras $eOne Flew Over the Algebraist's Nest /$fby Michel Broué
205   $a1st ed. 2024.
210  1$aCham :$cSpringer International Publishing :$cImprint: Springer,$d2024.
215   $a1 online resource (528 pages)
311 08$aPrint version: Broué, Michel From Rings and Modules to Hopf Algebras Cham : Springer International Publishing AG,c2024 9783031500619 
320   $aIncludes bibliographical references and index.
327   $a1 Prerequisites and Preliminaries -- Part I Rings and Modules -- 2 Rings, Polynomials, Divisibility -- 3 Polynomial Rings in Several Indeterminates -- 4 More on Modules -- 5 On Representations of Finite Groups -- Part II Integral Domains, Polynomials, Fields -- 6 Prime and Maximal Ideals, Integral Domains -- 7 Fields, Division Rings -- Part III Finitely Generated Modules -- 8 Integrality, Noetherianity -- 9 Finitely Generated Projective Modules -- 10 Finitely Generated Modules Over Dedekind Domains -- 11 Complement on Dedekind Domains -- Part IV Characteristic Zero Linear Representations of Finite Groups -- 12 Monoidal Categories: An Introduction -- 13 Characteristic 0 Representations -- 14 Playing With the Base Field -- 15 Induction and Restriction: Some Applications to Finite Groups -- 16 Brauer?s Theorem and Some Applications -- 17 Graded Representations and Characters -- 18 The Drinfeld?Lusztig Double of a Group Algebra.
330   $aThis textbook provides an introduction to fundamental concepts of algebra at upper undergraduate to graduate level, covering the theory of rings, fields and modules, as well as the representation theory of finite groups. Throughout the book, the exposition relies on universal constructions, making systematic use of quotients and category theory ? whose language is introduced in the first chapter. The book is divided into four parts. Parts I and II cover foundations of rings and modules, field theory and generalities on finite group representations, insisting on rings of polynomials and their ideals. Part III culminates in the structure theory of finitely generated modules over Dedekind domains and its applications to abelian groups, linear maps, and foundations of algebraic number theory. Part IV is an extensive study of linear representations of finite groups over fields of characteristic zero, including graded representations and graded characters as well as a final chapter on the Drinfeld?Lusztig double of a group algebra, appearing for the first time in a textbook at this level. Based on over twenty years of teaching various aspects of algebra, mainly at the École Normale Supérieure (Paris) and at Peking University, the book reflects the audiences of the author's courses. In particular, foundations of abstract algebra, like linear algebra and elementary group theory, are assumed of the reader. Each of the of four parts can be used for a course ? with a little ad hoc complement on the language of categories. Thanks to its rich choice of topics, the book can also serve students as a reference throughout their studies, from undergraduate to advanced graduate level.
606   $aAlgebra
606   $aAlgebraic fields
606   $aPolynomials
606   $aGroup theory
606   $aAlgebra, Homological
606   $aCommutative algebra
606   $aCommutative rings
606   $aAlgebra
606   $aField Theory and Polynomials
606   $aGroup Theory and Generalizations
606   $aCategory Theory, Homological Algebra
606   $aCommutative Rings and Algebras
606   $aÀlgebra$2thub
606   $aÀlgebres de Hopf$2thub
608   $aLlibres electrònics$2thub
615  0$aAlgebra.
615  0$aAlgebraic fields.
615  0$aPolynomials.
615  0$aGroup theory.
615  0$aAlgebra, Homological.
615  0$aCommutative algebra.
615  0$aCommutative rings.
615 14$aAlgebra.
615 24$aField Theory and Polynomials.
615 24$aGroup Theory and Generalizations.
615 24$aCategory Theory, Homological Algebra.
615 24$aCommutative Rings and Algebras.
615  7$aÀlgebra
615  7$aÀlgebres de Hopf
676   $a512.9
700   $aBroue?$b Michel$00
801  0$bMiAaPQ
801  1$bMiAaPQ
801  2$bMiAaPQ
906   $aBOOK
912   $a9910831010103321
996   $aFrom Rings and Modules to Hopf Algebras$93970411
997   $aUNINA