| Description |
1 online resource (xviii, 347 pages) |
| Series |
Mathematics and statistics series (ISTE) |
|
Analysis for PDEs set ; volume 1 |
|
Analysis for PDEs set ; volume 1.
|
|
Mathematics and statistics series (ISTE)
|
| Contents |
Introduction -- Familiarization with semi-normed spaces -- Notations -- Prerequisites -- Part 1. Semi-normed spaces ; Semi-normed spaces -- Comparison of semi-normed spaces -- Banach, Fréchet and Neumann spaces -- Hilbert spaces -- Product, intersection, sum and quotient of spaces -- Part 2. Continuous mappings ; Continuous mappings -- Images of sets under continuous mappings -- Properties of mappings in metrizable spaces -- Extension of mappings, equicontinuity -- Compactness in mapping spaces -- Spaces of linear or multilinear mappings -- Part 3. Weak topologies ; Duality -- Dual of a subspace -- Weak topology -- Properties of sets for the weak topology -- Reflexivity -- Extractable spaces -- Part 4. Differential calculus ; Differentiable mappings -- Differentiation of multivariable mappings -- Successive differentiations -- Derivation of functions of one real variable |
| Summary |
This book is the first of a set dedicated to the mathematical tools used in partial differential equations derived from physics. Its focus is on normed or semi-normed vector spaces, including the spaces of Banach, Fréchet and Hilbert, with new developments on Neumann spaces, but also on extractable spaces. The author presents the main properties of these spaces, which are useful for the construction of Lebesgue and Sobolev distributions with real or vector values and for solving partial differential equations. Differential calculus is also extended to semi-normed spaces. Simple methods, semi-norms, sequential properties and others are discussed, making these tools accessible to the greatest number of students - doctoral students, postgraduate students - engineers and researchers without restricting or generalizing the results |
| Bibliography |
Includes bibliographical references (pages 325-329), cited author index, and index |
| Notes |
Print version record |
| Subject |
Banach spaces.
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Fréchet spaces.
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Hilbert space.
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Normed linear spaces.
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Von Neumann algebras.
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Differentiable mappings.
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Mappings (Mathematics)
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Topology.
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Von Neumann algebras
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Topology
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Normed linear spaces
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Mappings (Mathematics)
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Hilbert space
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Fréchet spaces
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Differentiable mappings
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Banach spaces
|
| Form |
Electronic book
|
| ISBN |
9781119426530 |
|
1119426537 |
|
