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Determinants. --- Determinants. --- Déterminants (Mathématiques).
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Linear systems. --- Determinants. --- Matrices. --- Systèmes linéaires --- Déterminants (Mathématiques) --- Matrices.
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Equations, theory of --- Determinants --- Forms, Binary --- Group theory --- Équations, Théorie des. --- Déterminants (mathématiques) --- Formes binaires. --- Groupes, Théorie des.
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Equations, Theory of --- Équations algébriques. --- Galois theory --- Galois, Théorie de. --- Groupes, Théorie des. --- Group theory --- Algèbre linéaire. --- Algebras, Linear --- Déterminants (mathématiques) --- Determinants
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Equations, theory of --- Determinants --- Forms, Binary --- Group theory --- Équations, Théorie des. --- Déterminants (mathématiques) --- Formes binaires. --- Groupes, Théorie des. --- Équations, Théorie des. --- Déterminants (mathématiques) --- Groupes, Théorie des.
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The last treatise on the theory of determinants, by T. Muir, revised and enlarged by W. H. Metzler, was published by Dover Publications Inc. in 1960. It is an unabridged and corrected republication of the edition ori- nally published by Longman, Green and Co. in 1933 and contains a preface by Metzler dated 1928. The Table of Contents of this treatise is given in Appendix 13. A small number of other books devoted entirely to determinants have been published in English, but they contain little if anything of importance that was not known to Muir and Metzler. A few have appeared in German and Japanese. In contrast, the shelves of every mathematics library groan under the weight of books on linear algebra, some of which contain short chapters on determinants but usually only on those aspects of the subject which are applicable to the chapters on matrices. There appears to be tacit agreement among authorities on linear algebra that determinant theory is important only as a branch of matrix theory. In sections devoted entirely to the establishment of a determinantal relation, many authors de?ne a determinant by ?rst de?ning a matrixM and then adding the words: “Let detM be the determinant of the matrix M” as though determinants have no separate existence. This belief has no basis in history.
Algebra --- Determinants. --- Mathematical physics. --- Déterminants (Mathématiques) --- Physique mathématique --- Mathematical physics --- Determinants --- Mathematics --- Engineering & Applied Sciences --- Physical Sciences & Mathematics --- Mathematical Theory --- Applied Physics --- Mathematics. --- Matrix theory. --- Algebra. --- Physics. --- Linear and Multilinear Algebras, Matrix Theory. --- Theoretical, Mathematical and Computational Physics. --- Physical mathematics --- Physics --- Mathematical analysis --- Resultants
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Determinants --- Discriminant analysis --- Déterminants (Mathématiques) --- Analyse discriminante --- Discriminant analysis. --- 512.64 --- Analysis, Discriminant --- Classification theory (Statistics) --- Discrimination theory (Statistics) --- Multivariate analysis --- Resultants --- Algebra --- Mathematics --- Linear and multilinear algebra. Matrix theory --- 512.64 Linear and multilinear algebra. Matrix theory --- Déterminants (Mathématiques)
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517.98 --- 517.98 Functional analysis and operator theory --- Functional analysis and operator theory --- Nonselfadjoint operators. --- Hilbert space --- Nonselfadjoint operators --- Non-self-adjoint operators --- Operators, Non-self-adjoint --- Operators, Nonselfadjoint --- Linear operators --- Banach spaces --- Hyperspace --- Inner product spaces --- Operator theory --- Hilbert space. --- Determinants. --- Déterminants (mathématiques) --- Opérateurs linéaires. --- Formes normales (mathématiques) --- Normal forms (Mathematics) --- Déterminants (mathématiques) --- Analyse fonctionnelle --- Functional analysis --- Opérateurs linéaires. --- Formes normales (mathématiques) --- Functional analysis. --- Opérateurs linéaires --- Linear operators. --- Operateurs lineaires hilbertiens --- Espaces d'operateurs lineaires continus --- Ideaux normes
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