Resultado de la búsqueda
70 búsqueda de la palabra clave 'Fourier'
Refinar búsqueda Generar rss de la búsqueda
Link de la búsqueda
Título : Fourier Analysis on Finite Abelian Groups Tipo de documento: documento electrónico Autores: Bao Luong ; SpringerLink (Online service) Editorial: Boston : Birkhäuser Boston Fecha de publicación: 2009 Colección: Applied and Numerical Harmonic Analysis Número de páginas: XVI, 159 p Il.: online resource ISBN/ISSN/DL: 978-0-8176-4916-6 Idioma : Inglés (eng) Palabras clave: Mathematics Algebra Group theory Mathematical analysis Analysis (Mathematics) Fourier Theory and Generalizations Clasificación: 51 Matemáticas Resumen: Fourier analysis has been the inspiration for a technological wave of advances in fields such as imaging processing, financial modeling, cryptography, algorithms, and sequence design. This self-contained book provides a thorough look at the Fourier transform, one of the most useful tools in applied mathematics. With countless examples and unique exercise sets at the end of most sections, Fourier Analysis on Finite Abelian Groups is a perfect companion for a first course in Fourier analysis. The first two chapters provide fundamental material for a strong foundation to deal with subsequent chapters. Special topics covered include: * Computing eigenvalues of the Fourier transform * Applications to Banach algebras * Tensor decompositions of the Fourier transform * Quadratic Gaussian sums This book provides a useful introduction for well-prepared undergraduate and graduate students and powerful applications that may appeal to researchers and mathematicians. The only prerequisites are courses in group theory and linear algebra Nota de contenido: Preface -- Overview -- Chapter 1: Foundation Material -- Results from Group Theory -- Quadratic Congruences -- Chebyshev Systems of Functions -- Chapter 2: The Fourier Transform -- A Special Class of Linear Operators -- Characters -- The Orthogonal Relations for Characters -- The Fourier Transform -- The Fourier Transform of Periodic Functions -- The Inverse Fourier Transform -- The Inversion Formula -- Matrices of the Fourier Transform -- Iterated Fourier Transform -- Is the Fourier Transform a Self-Adjoint Operator? -- The Convolutions Operator -- Banach Algebra -- The Uncertainty Principle -- The Tensor Decomposition -- The Tensor Decomposition of Vector Spaces -- The Fourier Transform and Isometries -- Reduction to Finite Cyclic Groups -- Symmetric and Antisymmetric Functions -- Eigenvalues and Eigenvectors -- Spectrak Theorem -- Ergodic Theorem -- Multiplicities of Eigenvalues -- The Quantum Fourier Transform -- Chapter 3: Quadratic Sums -- 1. The Number G_n(1) -- Reduction Formulas En línea: http://dx.doi.org/10.1007/978-0-8176-4916-6 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33954 Fourier Analysis on Finite Abelian Groups [documento electrónico] / Bao Luong ; SpringerLink (Online service) . - Boston : Birkhäuser Boston, 2009 . - XVI, 159 p : online resource. - (Applied and Numerical Harmonic Analysis) .
ISBN : 978-0-8176-4916-6
Idioma : Inglés (eng)
Palabras clave: Mathematics Algebra Group theory Mathematical analysis Analysis (Mathematics) Fourier Theory and Generalizations Clasificación: 51 Matemáticas Resumen: Fourier analysis has been the inspiration for a technological wave of advances in fields such as imaging processing, financial modeling, cryptography, algorithms, and sequence design. This self-contained book provides a thorough look at the Fourier transform, one of the most useful tools in applied mathematics. With countless examples and unique exercise sets at the end of most sections, Fourier Analysis on Finite Abelian Groups is a perfect companion for a first course in Fourier analysis. The first two chapters provide fundamental material for a strong foundation to deal with subsequent chapters. Special topics covered include: * Computing eigenvalues of the Fourier transform * Applications to Banach algebras * Tensor decompositions of the Fourier transform * Quadratic Gaussian sums This book provides a useful introduction for well-prepared undergraduate and graduate students and powerful applications that may appeal to researchers and mathematicians. The only prerequisites are courses in group theory and linear algebra Nota de contenido: Preface -- Overview -- Chapter 1: Foundation Material -- Results from Group Theory -- Quadratic Congruences -- Chebyshev Systems of Functions -- Chapter 2: The Fourier Transform -- A Special Class of Linear Operators -- Characters -- The Orthogonal Relations for Characters -- The Fourier Transform -- The Fourier Transform of Periodic Functions -- The Inverse Fourier Transform -- The Inversion Formula -- Matrices of the Fourier Transform -- Iterated Fourier Transform -- Is the Fourier Transform a Self-Adjoint Operator? -- The Convolutions Operator -- Banach Algebra -- The Uncertainty Principle -- The Tensor Decomposition -- The Tensor Decomposition of Vector Spaces -- The Fourier Transform and Isometries -- Reduction to Finite Cyclic Groups -- Symmetric and Antisymmetric Functions -- Eigenvalues and Eigenvectors -- Spectrak Theorem -- Ergodic Theorem -- Multiplicities of Eigenvalues -- The Quantum Fourier Transform -- Chapter 3: Quadratic Sums -- 1. The Number G_n(1) -- Reduction Formulas En línea: http://dx.doi.org/10.1007/978-0-8176-4916-6 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33954 Ejemplares
Signatura Medio Ubicación Sub-localización Sección Estado ningún ejemplar
Título : Fourier Integral Operators Tipo de documento: documento electrónico Autores: J.J. Duistermaat ; SpringerLink (Online service) Editorial: Boston : Birkhäuser Boston Fecha de publicación: 2011 Colección: Modern Birkhäuser Classics Número de páginas: IX, 142 p Il.: online resource ISBN/ISSN/DL: 978-0-8176-8108-1 Idioma : Inglés (eng) Palabras clave: Mathematics Fourier analysis Integral equations Operator theory Partial differential Analysis Equations Theory Differential Clasificación: 51 Matemáticas Resumen: This volume is a useful introduction to the subject of Fourier integral operators and is based on the author's classic set of notes. Covering a range of topics from Hörmander’s exposition of the theory, Duistermaat approaches the subject from symplectic geometry and includes applications to hyperbolic equations (= equations of wave type) and oscillatory asymptotic solutions which may have caustics. This text is suitable for mathematicians and (theoretical) physicists with an interest in (linear) partial differential equations, especially in wave propagation, resp. WKB-methods. Familiarity with analysis (distributions and Fourier transformation) and differential geometry is useful. Additionally, this book is designed for a one-semester introductory course on Fourier integral operators aimed at a broad audience. This book remains a superb introduction to the theory of Fourier integral operators. While there are further advances discussed in other sources, this book can still be recommended as perhaps the very best place to start in the study of this subject. —SIAM Review This book is still interesting, giving a quick and elegant introduction to the field, more adapted to nonspecialists. —Zentralblatt MATH The book is completed with applications to the Cauchy problem for strictly hyperbolic equations and caustics in oscillatory integrals. The reader should have some background knowledge in analysis (distributions and Fourier transformations) and differential geometry. —Acta Sci. Math Nota de contenido: Preface -- 0. Introduction -- 1. Preliminaries -- 1.1 Distribution densities on manifolds -- 1.2 The method of stationary phase -- 1.3 The wave front set of a distribution -- 2. Local Theory of Fourier Integrals -- 2.1 Symbols -- 2.2 Distributions defined by oscillatory integrals -- 2.3 Oscillatory integrals with nondegenerate phase functions -- 2.4 Fourier integral operators (local theory) -- 2.5 Pseudodifferential operators in Rn -- 3. Symplectic Differential Geometry -- 3.1 Vector fields -- 3.2 Differential forms -- 3.3 The canonical 1- and 2-form T* (X) -- 3.4 Symplectic vector spaces -- 3.5 Symplectic differential geometry -- 3.6 Lagrangian manifolds -- 3.7 Conic Lagrangian manifolds -- 3.8 Classical mechanics and variational calculus -- 4. Global Theory of Fourier Integral Operators -- 4.1 Invariant definition of the principal symbol -- 4.2 Global theory of Fourier integral operators -- 4.3 Products with vanishing principal symbol -- 4.4 L2-continuity -- 5. Applications -- 5.1 The Cauchy problem for strictly hyperbolic differential operators with C-infinity coefficients -- 5.2 Oscillatory asymptotic solutions. Caustics -- References En línea: http://dx.doi.org/10.1007/978-0-8176-8108-1 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33103 Fourier Integral Operators [documento electrónico] / J.J. Duistermaat ; SpringerLink (Online service) . - Boston : Birkhäuser Boston, 2011 . - IX, 142 p : online resource. - (Modern Birkhäuser Classics) .
ISBN : 978-0-8176-8108-1
Idioma : Inglés (eng)
Palabras clave: Mathematics Fourier analysis Integral equations Operator theory Partial differential Analysis Equations Theory Differential Clasificación: 51 Matemáticas Resumen: This volume is a useful introduction to the subject of Fourier integral operators and is based on the author's classic set of notes. Covering a range of topics from Hörmander’s exposition of the theory, Duistermaat approaches the subject from symplectic geometry and includes applications to hyperbolic equations (= equations of wave type) and oscillatory asymptotic solutions which may have caustics. This text is suitable for mathematicians and (theoretical) physicists with an interest in (linear) partial differential equations, especially in wave propagation, resp. WKB-methods. Familiarity with analysis (distributions and Fourier transformation) and differential geometry is useful. Additionally, this book is designed for a one-semester introductory course on Fourier integral operators aimed at a broad audience. This book remains a superb introduction to the theory of Fourier integral operators. While there are further advances discussed in other sources, this book can still be recommended as perhaps the very best place to start in the study of this subject. —SIAM Review This book is still interesting, giving a quick and elegant introduction to the field, more adapted to nonspecialists. —Zentralblatt MATH The book is completed with applications to the Cauchy problem for strictly hyperbolic equations and caustics in oscillatory integrals. The reader should have some background knowledge in analysis (distributions and Fourier transformations) and differential geometry. —Acta Sci. Math Nota de contenido: Preface -- 0. Introduction -- 1. Preliminaries -- 1.1 Distribution densities on manifolds -- 1.2 The method of stationary phase -- 1.3 The wave front set of a distribution -- 2. Local Theory of Fourier Integrals -- 2.1 Symbols -- 2.2 Distributions defined by oscillatory integrals -- 2.3 Oscillatory integrals with nondegenerate phase functions -- 2.4 Fourier integral operators (local theory) -- 2.5 Pseudodifferential operators in Rn -- 3. Symplectic Differential Geometry -- 3.1 Vector fields -- 3.2 Differential forms -- 3.3 The canonical 1- and 2-form T* (X) -- 3.4 Symplectic vector spaces -- 3.5 Symplectic differential geometry -- 3.6 Lagrangian manifolds -- 3.7 Conic Lagrangian manifolds -- 3.8 Classical mechanics and variational calculus -- 4. Global Theory of Fourier Integral Operators -- 4.1 Invariant definition of the principal symbol -- 4.2 Global theory of Fourier integral operators -- 4.3 Products with vanishing principal symbol -- 4.4 L2-continuity -- 5. Applications -- 5.1 The Cauchy problem for strictly hyperbolic differential operators with C-infinity coefficients -- 5.2 Oscillatory asymptotic solutions. Caustics -- References En línea: http://dx.doi.org/10.1007/978-0-8176-8108-1 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33103 Ejemplares
Signatura Medio Ubicación Sub-localización Sección Estado ningún ejemplar
Título : Lectures on Constructive Approximation : Fourier, Spline, and Wavelet Methods on the Real Line, the Sphere, and the Ball Tipo de documento: documento electrónico Autores: Volker Michel ; SpringerLink (Online service) Editorial: Boston : Birkhäuser Boston Fecha de publicación: 2013 Otro editor: Imprint: Birkhäuser Colección: Applied and Numerical Harmonic Analysis Número de páginas: XVI, 326 p. 7 illus., 5 illus. in color Il.: online resource ISBN/ISSN/DL: 978-0-8176-8403-7 Idioma : Inglés (eng) Palabras clave: Mathematics Approximation theory Fourier analysis Special functions Numerical Physics Approximations and Expansions Functions Analysis Mathematical Methods in Clasificación: 51 Matemáticas Resumen: Lectures on Constructive Approximation: Fourier, Spline, and Wavelet Methods on the Real Line, the Sphere, and the Ball focuses on spherical problems as they occur in the geosciences and medical imaging. It comprises the author’s lectures on classical approximation methods based on orthogonal polynomials and selected modern tools such as splines and wavelets. Methods for approximating functions on the real line are treated first, as they provide the foundations for the methods on the sphere and the ball and are useful for the analysis of time-dependent (spherical) problems. The author then examines the transfer of these spherical methods to problems on the ball, such as the modeling of the Earth’s or the brain’s interior. Specific topics covered include: * the advantages and disadvantages of Fourier, spline, and wavelet methods * theory and numerics of orthogonal polynomials on intervals, spheres, and balls * cubic splines and splines based on reproducing kernels * multiresolution analysis using wavelets and scaling functions This textbook is written for students in mathematics, physics, engineering, and the geosciences who have a basic background in analysis and linear algebra. The work may also be suitable as a self-study resource for researchers in the above-mentioned fields Nota de contenido: Introduction: the Problem to be Solved -- Part I Basics -- Basic Fundamentals—What You Need to Know -- Approximation of Functions on the Real Line -- Part II Approximation on the Sphere -- Basic Aspects -- Fourier Analysis -- Spherical Splines -- Spherical Wavelet Analysis -- Spherical Slepian Functions -- Part III Approximation on the 3D Ball -- Orthonormal Bases -- Splines -- Wavelets for Inverse Problems on the 3D Ball -- The Regularized Functional Matching Pursuit (RFMP) -- References -- Index En línea: http://dx.doi.org/10.1007/978-0-8176-8403-7 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=32181 Lectures on Constructive Approximation : Fourier, Spline, and Wavelet Methods on the Real Line, the Sphere, and the Ball [documento electrónico] / Volker Michel ; SpringerLink (Online service) . - Boston : Birkhäuser Boston : Imprint: Birkhäuser, 2013 . - XVI, 326 p. 7 illus., 5 illus. in color : online resource. - (Applied and Numerical Harmonic Analysis) .
ISBN : 978-0-8176-8403-7
Idioma : Inglés (eng)
Palabras clave: Mathematics Approximation theory Fourier analysis Special functions Numerical Physics Approximations and Expansions Functions Analysis Mathematical Methods in Clasificación: 51 Matemáticas Resumen: Lectures on Constructive Approximation: Fourier, Spline, and Wavelet Methods on the Real Line, the Sphere, and the Ball focuses on spherical problems as they occur in the geosciences and medical imaging. It comprises the author’s lectures on classical approximation methods based on orthogonal polynomials and selected modern tools such as splines and wavelets. Methods for approximating functions on the real line are treated first, as they provide the foundations for the methods on the sphere and the ball and are useful for the analysis of time-dependent (spherical) problems. The author then examines the transfer of these spherical methods to problems on the ball, such as the modeling of the Earth’s or the brain’s interior. Specific topics covered include: * the advantages and disadvantages of Fourier, spline, and wavelet methods * theory and numerics of orthogonal polynomials on intervals, spheres, and balls * cubic splines and splines based on reproducing kernels * multiresolution analysis using wavelets and scaling functions This textbook is written for students in mathematics, physics, engineering, and the geosciences who have a basic background in analysis and linear algebra. The work may also be suitable as a self-study resource for researchers in the above-mentioned fields Nota de contenido: Introduction: the Problem to be Solved -- Part I Basics -- Basic Fundamentals—What You Need to Know -- Approximation of Functions on the Real Line -- Part II Approximation on the Sphere -- Basic Aspects -- Fourier Analysis -- Spherical Splines -- Spherical Wavelet Analysis -- Spherical Slepian Functions -- Part III Approximation on the 3D Ball -- Orthonormal Bases -- Splines -- Wavelets for Inverse Problems on the 3D Ball -- The Regularized Functional Matching Pursuit (RFMP) -- References -- Index En línea: http://dx.doi.org/10.1007/978-0-8176-8403-7 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=32181 Ejemplares
Signatura Medio Ubicación Sub-localización Sección Estado ningún ejemplar
Título : Lp-Theory of Cylindrical Boundary Value Problems : An Operator-Valued Fourier Multiplier and Functional Calculus Approach Tipo de documento: documento electrónico Autores: Tobias Nau ; SpringerLink (Online service) Editorial: Wiesbaden : Vieweg+Teubner Verlag Fecha de publicación: 2012 Número de páginas: XVI, 188p. 14 illus. in color Il.: online resource ISBN/ISSN/DL: 978-3-8348-2505-6 Idioma : Inglés (eng) Palabras clave: Mathematics Fourier analysis Analysis Clasificación: 51 Matemáticas Resumen: Tobias Nau addresses initial boundary value problems in cylindrical space domains with the aid of modern techniques from functional analysis and operator theory. In particular, the author uses concepts from Fourier analysis of functions with values in Banach spaces and the operator-valued functional calculus of sectorial operators. He applies abstract results to concrete problems in cylindrical space domains such as the heat equation subject to numerous boundary conditions and equations arising from fluid dynamics Nota de contenido: Fourier Transform and Fourier Series -- Operator-valued Fourier multipliers and functional calculus -- Maximal Lp-Regularity -- Parameter-Elliptic Boundary Value Problems in Cylindrical Domains -- Periodic and Mixed Dirichlet-Neumann Boundary Conditions for the Laplacian -- Stokes Problem and Helmholtz Projection in Rectangular Cylinders En línea: http://dx.doi.org/10.1007/978-3-8348-2505-6 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33022 Lp-Theory of Cylindrical Boundary Value Problems : An Operator-Valued Fourier Multiplier and Functional Calculus Approach [documento electrónico] / Tobias Nau ; SpringerLink (Online service) . - Wiesbaden : Vieweg+Teubner Verlag, 2012 . - XVI, 188p. 14 illus. in color : online resource.
ISBN : 978-3-8348-2505-6
Idioma : Inglés (eng)
Palabras clave: Mathematics Fourier analysis Analysis Clasificación: 51 Matemáticas Resumen: Tobias Nau addresses initial boundary value problems in cylindrical space domains with the aid of modern techniques from functional analysis and operator theory. In particular, the author uses concepts from Fourier analysis of functions with values in Banach spaces and the operator-valued functional calculus of sectorial operators. He applies abstract results to concrete problems in cylindrical space domains such as the heat equation subject to numerous boundary conditions and equations arising from fluid dynamics Nota de contenido: Fourier Transform and Fourier Series -- Operator-valued Fourier multipliers and functional calculus -- Maximal Lp-Regularity -- Parameter-Elliptic Boundary Value Problems in Cylindrical Domains -- Periodic and Mixed Dirichlet-Neumann Boundary Conditions for the Laplacian -- Stokes Problem and Helmholtz Projection in Rectangular Cylinders En línea: http://dx.doi.org/10.1007/978-3-8348-2505-6 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33022 Ejemplares
Signatura Medio Ubicación Sub-localización Sección Estado ningún ejemplar
Título : Classical Fourier Analysis Tipo de documento: documento electrónico Autores: Loukas Grafakos ; SpringerLink (Online service) Editorial: New York, NY : Springer New York Fecha de publicación: 2008 Colección: Graduate Texts in Mathematics, ISSN 0072-5285 num. 249 Número de páginas: XVI, 492 p. 10 illus Il.: online resource ISBN/ISSN/DL: 978-0-387-09432-8 Idioma : Inglés (eng) Palabras clave: Mathematics Mathematical analysis Analysis (Mathematics) Harmonic Fourier Functional Abstract Clasificación: 51 Matemáticas Resumen: The primary goal of these two volumes is to present the theoretical foundation of the field of Euclidean Harmonic analysis. The original edition was published as a single volume, but due to its size, scope, and the addition of new material, the second edition consists of two volumes. The present edition contains a new chapter on time-frequency analysis and the Carleson-Hunt theorem. The first volume contains the classical topics such as Interpolation, Fourier Series, the Fourier Transform, Maximal Functions, Singular Integrals, and Littlewood-Paley Theory. The second volume contains more recent topics such as Function Spaces, Atomic Decompositions, Singular Integrals of Nonconvolution Type, and Weighted Inequalities. These volumes are mainly addressed to graduate students in mathematics and are designed for a two-course sequence on the subject with additional material included for reference. The prerequisites for the first volume are satisfactory completion of courses in real and complex variables. The second volume assumes material from the first. This book is intended to present the selected topics in depth and stimulate further study. Although the emphasis falls on real variable methods in Euclidean spaces, a chapter is devoted to the fundamentals of analysis on the torus. This material is included for historical reasons, as the genesis of Fourier analysis can be found in trigonometric expansions of periodic functions in several variables. About the first edition: "Grafakos's book is very user-friendly with numerous examples illustrating the definitions and ideas... The treatment is thoroughly modern with free use of operators and functional analysis. Morever, unlike many authors, Grafakos has clearly spent a great deal of time preparing the exercises." - Kenneth Ross, MAA Online Nota de contenido: Preface -- Lp Spaces and Interpolation -- Maximal Functions, Fourier Transform, and Distributions -- Fourier Analysis on the Torus -- Singular Integrals of Convolution Type -- Littlewood-Paley Theory and Multipliers -- Gamma and Beta Functions -- Bessel Functions -- Rademacher Functions -- Spherical Coordinates -- Some Trigonometric Identities and Inequalities -- Summation by Parts -- Basic Functional Analysis -- The Minimax Lemma -- The Schur Lemma -- The Whitney Decomposition of Open Sets in Rn -- Smoothness and Vanishing Moments -- Glossary -- References -- Index En línea: http://dx.doi.org/10.1007/978-0-387-09432-8 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=34142 Classical Fourier Analysis [documento electrónico] / Loukas Grafakos ; SpringerLink (Online service) . - New York, NY : Springer New York, 2008 . - XVI, 492 p. 10 illus : online resource. - (Graduate Texts in Mathematics, ISSN 0072-5285; 249) .
ISBN : 978-0-387-09432-8
Idioma : Inglés (eng)
Palabras clave: Mathematics Mathematical analysis Analysis (Mathematics) Harmonic Fourier Functional Abstract Clasificación: 51 Matemáticas Resumen: The primary goal of these two volumes is to present the theoretical foundation of the field of Euclidean Harmonic analysis. The original edition was published as a single volume, but due to its size, scope, and the addition of new material, the second edition consists of two volumes. The present edition contains a new chapter on time-frequency analysis and the Carleson-Hunt theorem. The first volume contains the classical topics such as Interpolation, Fourier Series, the Fourier Transform, Maximal Functions, Singular Integrals, and Littlewood-Paley Theory. The second volume contains more recent topics such as Function Spaces, Atomic Decompositions, Singular Integrals of Nonconvolution Type, and Weighted Inequalities. These volumes are mainly addressed to graduate students in mathematics and are designed for a two-course sequence on the subject with additional material included for reference. The prerequisites for the first volume are satisfactory completion of courses in real and complex variables. The second volume assumes material from the first. This book is intended to present the selected topics in depth and stimulate further study. Although the emphasis falls on real variable methods in Euclidean spaces, a chapter is devoted to the fundamentals of analysis on the torus. This material is included for historical reasons, as the genesis of Fourier analysis can be found in trigonometric expansions of periodic functions in several variables. About the first edition: "Grafakos's book is very user-friendly with numerous examples illustrating the definitions and ideas... The treatment is thoroughly modern with free use of operators and functional analysis. Morever, unlike many authors, Grafakos has clearly spent a great deal of time preparing the exercises." - Kenneth Ross, MAA Online Nota de contenido: Preface -- Lp Spaces and Interpolation -- Maximal Functions, Fourier Transform, and Distributions -- Fourier Analysis on the Torus -- Singular Integrals of Convolution Type -- Littlewood-Paley Theory and Multipliers -- Gamma and Beta Functions -- Bessel Functions -- Rademacher Functions -- Spherical Coordinates -- Some Trigonometric Identities and Inequalities -- Summation by Parts -- Basic Functional Analysis -- The Minimax Lemma -- The Schur Lemma -- The Whitney Decomposition of Open Sets in Rn -- Smoothness and Vanishing Moments -- Glossary -- References -- Index En línea: http://dx.doi.org/10.1007/978-0-387-09432-8 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=34142 Ejemplares
Signatura Medio Ubicación Sub-localización Sección Estado ningún ejemplar PermalinkExcursions in Harmonic Analysis, Volume 1 / SpringerLink (Online service) ; Travis D. Andrews ; Radu Balan ; John J. Benedetto ; Wojciech Czaja ; Kasso A. Okoudjou (2013)
Permalink
PermalinkPermalinkPermalink
