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The main theme of the book is the study, from the standpoint of s-numbers, of integral operators of Hardy type and related Sobolev embeddings. In the theory of s-numbers the idea is to attach to every bounded linear map between Banach spaces a monotone decreasing sequence of non-negative numbers with a view to the classification of operators according to the way in which these numbers approach a limit: approximation numbers provide an especially important example of such numbers. The asymptotic behavior of the s-numbers of Hardy operators acting between Lebesgue spaces is determined here in a wide variety of cases. The proof methods involve the geometry of Banach spaces and generalized trigonometric functions; there are connections with the theory of the p-Laplacian.
Eigenvalues --- Embeddings (Mathematics) --- Trigonometrical functions --- Mathematics --- Engineering & Applied Sciences --- Physical Sciences & Mathematics --- Algebra --- Applied Mathematics --- Trigonometrical functions. --- Circular functions --- Mathematics. --- Mathematical analysis. --- Analysis (Mathematics). --- Approximation theory. --- Functional analysis. --- Differential equations. --- Special functions. --- Analysis. --- Approximations and Expansions. --- Functional Analysis. --- Special Functions. --- Ordinary Differential Equations. --- Mathematics Education. --- Study and teaching. --- Special functions --- Mathematical analysis --- 517.91 Differential equations --- Differential equations --- Functional calculus --- Calculus of variations --- Functional equations --- Integral equations --- Theory of approximation --- Functional analysis --- Functions --- Polynomials --- Chebyshev systems --- 517.1 Mathematical analysis --- Math --- Science --- Transcendental functions --- Global analysis (Mathematics). --- Functions, special. --- Differential Equations. --- Analysis, Global (Mathematics) --- Differential topology --- Functions of complex variables --- Geometry, Algebraic --- Mathematics—Study and teaching .
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Karl Gustafson is the creater of the theory of antieigenvalue analysis. Its applications spread through fields as diverse as numerical analysis, wavelets, statistics, quantum mechanics, and finance. Antieigenvalue analysis, with its operator trigonometry, is a unifying language which enables new and deeper geometrical understanding of essentially every result in operator theory and matrix theory, together with their applications. This book will open up its methods to a wide range of specialists.
Eigenvalues. --- Mathematical analysis. --- Numerical analysis. --- Wavelets (Mathematics) --- Statistics. --- Quantum theory. --- Quantum dynamics --- Quantum mechanics --- Quantum physics --- Physics --- Mechanics --- Thermodynamics --- Statistical analysis --- Statistical data --- Statistical methods --- Statistical science --- Mathematics --- Econometrics --- Wavelet analysis --- Harmonic analysis --- Mathematical analysis --- 517.1 Mathematical analysis --- Matrices --- 517.1 --- Trigonometrical functions --- Circular functions --- Transcendental functions
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