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Rings (Algebra) --- 512.55 --- Algebraic rings --- Ring theory --- Algebraic fields --- 512.55 Rings and modules --- Rings and modules --- Ordered algebraic structures
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Ordered algebraic structures --- Differential operators. --- Opérateurs différentiels --- Rings (Algebra) --- Anneaux (algèbre) --- Invariants. --- Invariants --- Differential operators --- Algebraic rings --- Ring theory --- Algebraic fields --- Operators, Differential --- Differential equations --- Operator theory --- Opérateurs différentiels.
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Ordered algebraic structures --- 512.55 --- Ideals (Algebra) --- Rings (Algebra) --- Algebraic rings --- Ring theory --- Algebraic fields --- Algebraic ideals --- Rings and modules --- Ideals (Algebra). --- Rings (Algebra). --- 512.55 Rings and modules --- Algèbres commutatives --- Algebres et anneaux associatifs --- Ideaux et modules
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Ordered algebraic structures --- RINGS (Algebra) --- Dimension theory (Algebra) --- 512.55 --- Rings (Algebra) --- Algebraic rings --- Ring theory --- Algebraic fields --- Associative algebras --- Commutative algebra --- Rings and modules --- 512.55 Rings and modules
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Most parts of algebra have undergone great changes and advances in recent years, perhaps none more so than ring theory. In this volume, Paul Cohn provides a clear and structured introduction to the subject. After a chapter on the definition of rings and modules there are brief accounts of Artinian rings, commutative Noetherian rings and ring constructions, such as the direct product. Tensor product and rings of fractions, followed by a description of free rings. The reader is assumed to have a basic understanding of set theory, group theory and vector spaces. Over two hundred carefully selected exercises are included, most with outline solutions.
512.56 --- 512.56 Lattices, including Boolean rings and algebras --- Lattices, including Boolean rings and algebras --- Rings (Algebra) --- Algebraic rings --- Ring theory --- Algebraic fields --- Ordered algebraic structures --- Algebra. --- Mathematics --- Mathematical analysis
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Ordered algebraic structures --- 512.55 --- Algebraic fields --- Ideals (Algebra) --- Rings (Algebra) --- Algebraic rings --- Ring theory --- Algebraic ideals --- Algebraic number fields --- Algebraic numbers --- Fields, Algebraic --- Algebra, Abstract --- Algebraic number theory --- Rings and modules --- 512.55 Rings and modules --- IDEALS (Algebra) --- RINGS (Algebra) --- Ensembles ordonnés
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Topology --- Ordered algebraic structures --- Function spaces --- Functions, Continuous --- RINGS (Algebra) --- IDEALS (Algebra) --- 517.986 --- Ideals (Algebra) --- Rings (Algebra) --- Algebraic rings --- Ring theory --- Algebraic fields --- Algebraic ideals --- Continuous functions --- Spaces, Function --- Functional analysis --- Topological algebras. Theory of infinite-dimensional representations --- Function spaces. --- Functions, Continuous. --- Ideals (Algebra). --- Rings (Algebra). --- 517.986 Topological algebras. Theory of infinite-dimensional representations
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From the reviews: "This book presents an important and novel approach to Jordan algebras. Jordan algebras have come to play a role in many areas of mathematics, including Lie algebras and the geometry of Chevalley groups. Springer's work will be of service to research workers familiar with linear algebraic groups who find they need to know something about Jordan algebras and will provide Jordan algebraists with new techniques and a new approach to finite-dimensional algebras over fields." (American Scientist) "By placing the classification of Jordan algebras in the perspective of classification of certain root systems, the book demonstrates that the structure theories associative, Lie, and Jordan algebras are not separate creations but rather instances of the one all-encompassing miracle of root systems. ..." (Math. Reviews).
Jordan algebras --- Linear algebraic groups --- Jordan, Algèbres de --- Groupes linéaires algébriques --- Jordan, Algèbres de. --- Jordan algebras. --- Linear algebraic groups. --- 512 --- 512 Algebra --- Algebra --- Group theory --- Ordered algebraic structures --- Nonassociative rings. --- Rings (Algebra). --- Group theory. --- Non-associative Rings and Algebras. --- Group Theory and Generalizations. --- Groups, Theory of --- Substitutions (Mathematics) --- Algebraic rings --- Ring theory --- Algebraic fields --- Rings (Algebra) --- Groupes algébriques linéaires
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512.55 --- Modules (Algebra) --- Finite number systems --- Modular systems (Algebra) --- 512.55 Rings and modules --- Rings and modules --- Algebras, Linear --- Rings (Algebra) --- Algebraic rings --- Ring theory --- Algebraic fields --- Algebra --- Finite groups --- Linear algebra --- Algebra, Universal --- Generalized spaces --- Mathematical analysis --- Calculus of operations --- Line geometry --- Topology --- 512 --- 512 Algebra --- #WWIS:d.d. Prof. L. Bouckaert/ALTO --- Ordered algebraic structures --- Algebras, Linear. --- Modules (Algebra). --- Rings (Algebra). --- lineaire algebra --- Algèbre
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Much progress has been made during the last decade on the subjects of non commutative valuation rings, and of semi-hereditary and Priifer orders in a simple Artinian ring which are considered, in a sense, as global theories of non-commu tative valuation rings. So it is worth to present a survey of the subjects in a self-contained way, which is the purpose of this book. Historically non-commutative valuation rings of division rings were first treat ed systematically in Schilling's Book [Sc], which are nowadays called invariant valuation rings, though invariant valuation rings can be traced back to Hasse's work in [Has]. Since then, various attempts have been made to study the ideal theory of orders in finite dimensional algebras over fields and to describe the Brauer groups of fields by usage of "valuations", "places", "preplaces", "value functions" and "pseudoplaces". In 1984, N. 1. Dubrovin defined non-commutative valuation rings of simple Artinian rings with notion of places in the category of simple Artinian rings and obtained significant results on non-commutative valuation rings (named Dubrovin valuation rings after him) which signify that these rings may be the correct def inition of valuation rings of simple Artinian rings. Dubrovin valuation rings of central simple algebras over fields are, however, not necessarily to be integral over their centers.
Ordered algebraic structures --- Noncommutative rings. --- Valuation theory. --- Associative rings. --- Rings (Algebra). --- Algebra. --- Ordered algebraic structures. --- Category theory (Mathematics). --- Homological algebra. --- Commutative algebra. --- Commutative rings. --- Field theory (Physics). --- Associative Rings and Algebras. --- Order, Lattices, Ordered Algebraic Structures. --- Category Theory, Homological Algebra. --- Commutative Rings and Algebras. --- Field Theory and Polynomials. --- Classical field theory --- Continuum physics --- Physics --- Continuum mechanics --- Rings (Algebra) --- Algebra --- Homological algebra --- Algebra, Abstract --- Homology theory --- Category theory (Mathematics) --- Algebra, Homological --- Algebra, Universal --- Group theory --- Logic, Symbolic and mathematical --- Topology --- Functor theory --- Algebraic structures, Ordered --- Structures, Ordered algebraic --- Mathematics --- Mathematical analysis --- Algebraic rings --- Ring theory --- Algebraic fields --- Non-commutative rings --- Associative rings --- Algebraic number theory --- Topological fields
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