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While Volume I (by W.A.J. Luxemburg and A.C. Zaanen, NHML Volume 1, 1971) is devoted to the algebraic aspects of the theory, this volume emphasizes the analytical theory of Riesz spaces and operators between these spaces. Though the numbering of chapters continues on from the first volume, this does not imply that everything covered in Volume I is required for this volume, however the two volumes are to some extent complementary.
Analytical spaces --- 517.982 --- Linear spaces with topology and order or other structures --- Riesz spaces. --- 517.982 Linear spaces with topology and order or other structures --- Vector spaces. --- Linear spaces --- Linear vector spaces --- Algebras, Linear --- Functional analysis --- Vector analysis --- Riesz vector spaces --- Vector lattices --- Lattice theory --- Vector spaces --- Analyse fonctionnelle --- Functional analysis. --- Espaces vectoriels ordonnes
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Fundamentals of the theory of operator algebras. V1
Analytical spaces --- Operator theory --- Mathematics. --- Operator algebras. --- Operator algebras --- Algèbres d'opérateurs --- ELSEVIER-B EPUB-LIV-FT --- $ 9304 --- Algebras, Operator --- Topological algebras --- Math --- Science --- 517.986 --- 517.986 Topological algebras. Theory of infinite-dimensional representations --- Topological algebras. Theory of infinite-dimensional representations
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Volterra integral and differential equations
Volterra equations --- Integro-differential equations --- Integro-differential equations. --- Volterra equations. --- 517.9 --- Equations, Volterra --- Integral equations --- Integrodifferential equations --- Differential equations --- 517.9 Differential equations. Integral equations. Other functional equations. Finite differences. Calculus of variations. Functional analysis --- Differential equations. Integral equations. Other functional equations. Finite differences. Calculus of variations. Functional analysis
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Unified integration
Integrals. --- Mathematics. --- Math --- Science --- Calculus, Integral --- Integrals --- 517.518.1 --- 517.518.1 Measure. Integration. Differentiation --- Measure. Integration. Differentiation --- Intégrales --- Intégrales --- Integralen. --- Calcul intégral --- Fonctions de plusieurs variables réelles --- Calcul intégral --- Fonctions de plusieurs variables réelles --- Mesure et integration
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First order elliptic systems : a function theoretic approach
Differential equations, Elliptic. --- Differential equations, Elliptic --- Calculus --- Mathematics --- Physical Sciences & Mathematics --- Differential equations. --- 517.91 Differential equations --- Differential equations --- Elliptic differential equations --- Elliptic partial differential equations --- Linear elliptic differential equations --- Differential equations, Linear --- Differential equations, Partial
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Generalized functions : theory and technique
Theory of distributions (Functional analysis). --- Distribution [Analyse fonctionnelle]. --- Distributies [Functionaalanalyse]. --- Theory of distributions (Functional analysis) --- Mathematical analysis. --- 517.1 Mathematical analysis --- Mathematical analysis --- Distribution (Functional analysis) --- Distributions, Theory of (Functional analysis) --- Functions, Generalized --- Generalized functions --- Functional analysis
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Approximation theory --- Finite element method --- Théorie de l'approximation --- Méthode des éléments finis --- 517.96 --- #KVIV --- eindige elementen --- multigrid --- bouwkunde --- technische mechanica --- FEA (Numerical analysis) --- FEM (Numerical analysis) --- Finite element analysis --- Numerical analysis --- Isogeometric analysis --- Theory of approximation --- Functional analysis --- Functions --- Polynomials --- Chebyshev systems --- Finite differences. Functional and integral equations --- Approximation theory. --- Finite element method. --- 517.96 Finite differences. Functional and integral equations --- Théorie de l'approximation --- Méthode des éléments finis
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This book is an exposition of semi-Riemannian geometry (also called pseudo-Riemannian geometry)--the study of a smooth manifold furnished with a metric tensor of arbitrary signature. The principal special cases are Riemannian geometry, where the metric is positive definite, and Lorentz geometry. For many years these two geometries have developed almost independently: Riemannian geometry reformulated in coordinate-free fashion and directed toward global problems, Lorentz geometry in classical tensor notation devoted to general relativity. More recently, this divergence has been re
Differential geometry. Global analysis --- Calculus of tensors --- Manifolds (Mathematics) --- Relativity (Physics) --- Semi-Riemannian geometry --- #WPLT:dd.Prof.F.Symons --- 514.84 --- 515.165 --- 517.518.12 --- Geometry, Differential --- Topology --- 517.518.12 Theory of integration. Riemann integral. Lebesgue integral. Stieltjes integral --- Theory of integration. Riemann integral. Lebesgue integral. Stieltjes integral --- 515.165 Topology of smooth manifolds provided with additional structure. Kähler manifolds. Riemann manifolds --- Topology of smooth manifolds provided with additional structure. Kähler manifolds. Riemann manifolds --- 514.84 Geometric methods in quantum mechanics and in the theory of elementary particles --- Geometric methods in quantum mechanics and in the theory of elementary particles --- Absolute differential calculus --- Analysis, Tensor --- Calculus, Absolute differential --- Calculus, Tensor --- Tensor analysis --- Tensor calculus --- Geometry, Infinitesimal --- Vector analysis --- Spinor analysis --- Gravitation --- Nonrelativistic quantum mechanics --- Space and time --- Pseudo-Riemannian geometry --- Géométrie différentielle --- Relativité (physique) --- Geometry, Riemannian --- Riemann, Géométrie de --- Variétés (Mathématiques) --- Calcul tensoriel --- Relativité (Physique) --- Geometry, Riemannian. --- Calculus of tensors. --- Manifolds (Mathematics). --- Relativity (Physics). --- Semi-Riemannian geometry. --- Riemann geometry --- Riemannian geometry --- Generalized spaces --- Geometry, Non-Euclidean --- Géometrie différentielle globale --- Géometrie différentielle
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