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Year: 1985 Publisher: Göttingen : Vandenhoeck & Ruprecht,
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Mathematicians --- Correspondence. --- Hilbert, David, --- Klein, Felix, --- Correspondence. --- Correspondence.
Book
ISBN: 0897662997 9780897662994 Year: 1985 Volume: 452 Publisher: New York : New York Academy of Sciences,
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$ 88KL --- Science --- Engineering --- Physics --- Congresses --- Congresses. --- Functions of complex variables --- Riemann-Hilbert problems --- Fonctions d'une variable complexe --- Riemann-Hilbert, Problèmes de --- Riemann-Hilbert, Problèmes de. --- Mathématiques --- Recherche opérationnelle --- Functions of complex variables. --- Riemann-Hilbert problems. --- Mathématiques --- Recherche opérationnelle --- Riemann-Hilbert, Problèmes de --- Physique mathématique --- Principes variationnels --- Nombres, Théorie des --- Science - Congresses --- Engineering - Congresses --- Physics - Congresses
ISBN: 2705660194 9782705660192 Year: 1985 Publisher: Paris Hermann
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Topological spaces --- Spaces, Topological --- Topologie. --- Espaces localement compacts. --- Topology --- Locally compact spaces --- Analyse fonctionnelle --- Functional analysis --- Hilbert, Espaces de --- Hilbert space --- Fonctions continues --- Functions, Continuous
Book
Year: 1985 Publisher: Goettingen : Vandenhoeck & Ruprecht,
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Book
ISBN: 9516491375 Year: 1985 Publisher: Åbo Åbo akademi
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Ornstein-Uhlenbeck process --- Stochastic partial differential equations --- Banach spaces, Stochastic differential equations in --- Hilbert spaces, Stochastic differential equations in --- SPDE (Differential equations) --- Stochastic differential equations in Banach spaces --- Stochastic differential equations in Hilbert spaces --- Differential equations, Partial --- Brownian motion processes --- Gaussian processes --- Stationary processes
ISBN: 1139884182 1107099927 1107093937 110710243X 1107087694 0511662246 9781107087699 9780511662249 0521313147 9780521313148 Year: 1985 Volume: 105 Publisher: Cambridge [Cambridgeshire] New York Cambridge University Press
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This book, which is almost entirely devoted to unbounded operators, gives a unified treatment of the contemporary local spectral theory for unbounded closed operators on a complex Banach space. While the main part of the book is original, necessary background materials provided. There are some completely new topics treated, such as the complete spectral duality theory with the first comprehensive proof of the predual theorem, in two different versions. Also covered are spectral resolvents of various kinds (monotomic, strongly monotonic, almost localized, analytically invariant), and spectral decompositions with respect to the identity. The book concludes with an extensive reference list, including many papers published in the People's Republic of China, here brought to the attention of Western mathematicians for the first time. Pure mathematicians, especially those working in operator theory and functional analysis, will find this book of interest.
Closed operators. --- Banach spaces. --- Spectral theory (Mathematics) --- Functional analysis --- Hilbert space --- Measure theory --- Transformations (Mathematics) --- Functions of complex variables --- Generalized spaces --- Topology --- Operators, Closed --- Linear operators --- Operateurs lineaires --- Theorie spectrale --- Espaces de banach
ISBN: 9027718156 9401088136 9400952317 9789027718150 Year: 1985 Volume: 7 Publisher: Dordrecht Reidel
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Mathematical analysis --- Mathematical physics --- Statistical physics --- Integration, Functional --- Noncommutative algebras --- Operator theory --- 517.98 --- Von Neumann algebras --- Algebras, Von Neumann --- Algebras, W --- Neumann algebras --- Rings of operators --- W*-algebras --- C*-algebras --- Hilbert space --- Functional analysis --- Algebras, Noncommutative --- Non-commutative algebras --- Algebra --- Physical mathematics --- Physics --- Functional integration --- Integrals, Generalized --- Functional analysis and operator theory --- Mathematics --- Integration, Functional. --- Mathematical physics. --- Noncommutative algebras. --- Operator theory. --- Von Neumann algebras. --- 517.98 Functional analysis and operator theory
ISBN: 0226288625 0226288617 9780226223063 022622306X 9780226288611 9780226288628 Year: 1985 Volume: vol *2 Publisher: Chicago (Ill.): University of Chicago press
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Mathematical Physics is an introduction to such basic mathematical structures as groups, vector spaces, topological spaces, measure spaces, and Hilbert space. Geroch uses category theory to emphasize both the interrelationships among different structures and the unity of mathematics. Perhaps the most valuable feature of the book is the illuminating intuitive discussion of the "whys" of proofs and of axioms and definitions. This book, based on Geroch's University of Chicago course, will be especially helpful to those working in theoretical physics, including such areas as relativity, particle physics, and astrophysics.
Fysica [Mathematische ] --- Fysica [Wiskundige ] --- Mathematical physics --- Mathematische fysica --- Physical mathematics --- Physics -- Mathematics --- Physics [Mathematical ] --- Physique -- Mathématiques --- Physique -- Méthodes mathématiques --- Physique mathématique --- Physique théorique --- Wiskundige fysica --- Mathematical physics. --- Physics --- Mathematics --- Physique mathématique --- vectors, topology, physics, math, mathematics, hilbert space, mathematical structures, relativity, astrophysics, operators, spectral theorem, hermitian operator, bounded, topological groups, integrals, distribution, homology, functions, homotopy, connectedness, compactness, mappings, fock, algebra, lorentz, minkowski, direct products, multilinear, nonfiction.
ISBN: 0691083541 1400881595 Year: 1985 Publisher: Princeton, N.J.
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This book discusses some aspects of the theory of partial differential equations from the viewpoint of probability theory. It is intended not only for specialists in partial differential equations or probability theory but also for specialists in asymptotic methods and in functional analysis. It is also of interest to physicists who use functional integrals in their research. The work contains results that have not previously appeared in book form, including research contributions of the author.
Partial differential equations --- Differential equations, Partial. --- Probabilities. --- Integration, Functional. --- Functional integration --- Functional analysis --- Integrals, Generalized --- Probability --- Statistical inference --- Combinations --- Mathematics --- Chance --- Least squares --- Mathematical statistics --- Risk --- A priori estimate. --- Absolute continuity. --- Almost surely. --- Analytic continuation. --- Axiom. --- Big O notation. --- Boundary (topology). --- Boundary value problem. --- Bounded function. --- Calculation. --- Cauchy problem. --- Central limit theorem. --- Characteristic function (probability theory). --- Chebyshev's inequality. --- Coefficient. --- Comparison theorem. --- Continuous function (set theory). --- Continuous function. --- Convergence of random variables. --- Cylinder set. --- Degeneracy (mathematics). --- Derivative. --- Differential equation. --- Differential operator. --- Diffusion equation. --- Diffusion process. --- Dimension (vector space). --- Direct method in the calculus of variations. --- Dirichlet boundary condition. --- Dirichlet problem. --- Eigenfunction. --- Eigenvalues and eigenvectors. --- Elliptic operator. --- Elliptic partial differential equation. --- Equation. --- Existence theorem. --- Exponential function. --- Feynman–Kac formula. --- Fokker–Planck equation. --- Function space. --- Functional analysis. --- Fundamental solution. --- Gaussian measure. --- Girsanov theorem. --- Hessian matrix. --- Hölder condition. --- Independence (probability theory). --- Integral curve. --- Integral equation. --- Invariant measure. --- Iterated logarithm. --- Itô's lemma. --- Joint probability distribution. --- Laplace operator. --- Laplace's equation. --- Lebesgue measure. --- Limit (mathematics). --- Limit cycle. --- Limit point. --- Linear differential equation. --- Linear map. --- Lipschitz continuity. --- Markov chain. --- Markov process. --- Markov property. --- Maximum principle. --- Mean value theorem. --- Measure (mathematics). --- Modulus of continuity. --- Moment (mathematics). --- Monotonic function. --- Navier–Stokes equations. --- Nonlinear system. --- Ordinary differential equation. --- Parameter. --- Partial differential equation. --- Periodic function. --- Poisson kernel. --- Probabilistic method. --- Probability space. --- Probability theory. --- Probability. --- Random function. --- Regularization (mathematics). --- Schrödinger equation. --- Self-adjoint operator. --- Sign (mathematics). --- Simultaneous equations. --- Smoothness. --- State-space representation. --- Stochastic calculus. --- Stochastic differential equation. --- Stochastic. --- Support (mathematics). --- Theorem. --- Theory. --- Uniqueness theorem. --- Variable (mathematics). --- Weak convergence (Hilbert space). --- Wiener process.
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