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Titre : Atkins' Physical Chemistry Type de document : texte imprimé Auteurs : Peter Atkins, Auteur ; Julio de Paula, Auteur ; James Keeler, Auteur Mention d'édition : 11éd Editeur : Oxford University Press Année de publication : 2023 Importance : 927p Format : 27,5x22 cm ISBN/ISSN/EAN : 978-0-19-884781-6 Langues : Anglais (eng) Index. décimale : 541 Chimie physique et théorique Résumé : Atkins' Physical Chemistry is widely acknowledged by both students and lecturers around the globe to be the textbook of choice for studying physical chemistry. Now in its twelfth edition, the text has been enhanced with additional learning features, and the writing style has been refreshed to resonate with the modern student.
The gold standard physical chemistry text, which evolves with every edition to meet the needs of current students
Exceptional mathematical support - including annotated equations, equation checklists, and mathematical resources - enables students to master the maths which underlies physical chemistry
The development of problem solving and analytical skills is actively encouraged by frequent worked examples, discussion questions, exercises, and problems
A range of other learning features, including video tutorials, brief illustrations, and key concept checklists, are incorporated throughout to aid students in their study of physical chemistry
Also available as an e-book enhanced with self-assessment activities and multi-media content to offer a fully immersive experience and extra learning support.
New to this edition
A refreshed writing style is designed to retain clarity whilst matching the way you read
A new prologue, 'Energy: A First Look', provides you with the conceptual foundations on which to build your knowledge and understanding of physical chemistry
A new Topic within Focus 9 introduces you to the underlying principles of computational chemistry
New digital content includes 19 video tutorials about the key equations introduced in each Focus, interviews with physical chemists working in a range of industries, and dynamic graphs
Further self-test material added, including over 200 multiple choice questions, and extra exercises, which now total over 1,000, and problems, totalling over 700.Atkins' Physical Chemistry [texte imprimé] / Peter Atkins, Auteur ; Julio de Paula, Auteur ; James Keeler, Auteur . - 11éd . - [S.l.] : Oxford University Press, 2023 . - 927p ; 27,5x22 cm.
ISBN : 978-0-19-884781-6
Langues : Anglais (eng)
Index. décimale : 541 Chimie physique et théorique Résumé : Atkins' Physical Chemistry is widely acknowledged by both students and lecturers around the globe to be the textbook of choice for studying physical chemistry. Now in its twelfth edition, the text has been enhanced with additional learning features, and the writing style has been refreshed to resonate with the modern student.
The gold standard physical chemistry text, which evolves with every edition to meet the needs of current students
Exceptional mathematical support - including annotated equations, equation checklists, and mathematical resources - enables students to master the maths which underlies physical chemistry
The development of problem solving and analytical skills is actively encouraged by frequent worked examples, discussion questions, exercises, and problems
A range of other learning features, including video tutorials, brief illustrations, and key concept checklists, are incorporated throughout to aid students in their study of physical chemistry
Also available as an e-book enhanced with self-assessment activities and multi-media content to offer a fully immersive experience and extra learning support.
New to this edition
A refreshed writing style is designed to retain clarity whilst matching the way you read
A new prologue, 'Energy: A First Look', provides you with the conceptual foundations on which to build your knowledge and understanding of physical chemistry
A new Topic within Focus 9 introduces you to the underlying principles of computational chemistry
New digital content includes 19 video tutorials about the key equations introduced in each Focus, interviews with physical chemists working in a range of industries, and dynamic graphs
Further self-test material added, including over 200 multiple choice questions, and extra exercises, which now total over 1,000, and problems, totalling over 700.Réservation
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Code-barres Cote Support Localisation Section Disponibilité 24/324418 L/541.122 Livre Bibliothèque Mathématique informatique et sciences de la matière indéterminé Exclu du prêt 24/324419 L/541.122 Livre Bibliothèque Mathématique informatique et sciences de la matière indéterminé Disponible
Titre : An Introduction to Medicinal Chemistry Type de document : texte imprimé Auteurs : Graham L. Patrick, Auteur Mention d'édition : 7éd Editeur : Oxford University Press Année de publication : 2023 Importance : 925p Format : 27,5x22 cm ISBN/ISSN/EAN : 978-0-19-886666-4 Langues : Anglais (eng) Index. décimale : 615 Pharlacikigue et thérapeutique Résumé : Medication is widely used to support the human body to fight against infection and pain. In an era of pharmaceutical and medicinal challenges, we have all become more familiar with drug production and distribution. However, do we really know what happens before those drugs are distributed? What's the process behind drug discovery? How do our bodies interact with those chemicals?
An Introduction to Medicinal Chemistry, 7th edition, offers a complete and accessible approach to this multidisciplinary field. Its student-friendly writing style makes this text an ideal tool for those coming to the subject for first time, but also for students looking to deepen their understanding.
The book guides students through understanding the principles of drug action targets in Part A, to how drugs interact at a molecular level with our organs to offer therapeutic value in Part B, and exploring drug design and discovery, as well as regulatory procedures in Part C. Offering a practical approach, Part D provides a deeper look at specific tools and techniques of medicinal chemistry, concluding with emerging topics including antibodies and anticancer agents in Part E.
From principles to practice, accompanied by examples and case studies emerging from current biomedical research, the book will equip students with a robust understanding of medicinal chemistry, to prepare them for future success.An Introduction to Medicinal Chemistry [texte imprimé] / Graham L. Patrick, Auteur . - 7éd . - [S.l.] : Oxford University Press, 2023 . - 925p ; 27,5x22 cm.
ISBN : 978-0-19-886666-4
Langues : Anglais (eng)
Index. décimale : 615 Pharlacikigue et thérapeutique Résumé : Medication is widely used to support the human body to fight against infection and pain. In an era of pharmaceutical and medicinal challenges, we have all become more familiar with drug production and distribution. However, do we really know what happens before those drugs are distributed? What's the process behind drug discovery? How do our bodies interact with those chemicals?
An Introduction to Medicinal Chemistry, 7th edition, offers a complete and accessible approach to this multidisciplinary field. Its student-friendly writing style makes this text an ideal tool for those coming to the subject for first time, but also for students looking to deepen their understanding.
The book guides students through understanding the principles of drug action targets in Part A, to how drugs interact at a molecular level with our organs to offer therapeutic value in Part B, and exploring drug design and discovery, as well as regulatory procedures in Part C. Offering a practical approach, Part D provides a deeper look at specific tools and techniques of medicinal chemistry, concluding with emerging topics including antibodies and anticancer agents in Part E.
From principles to practice, accompanied by examples and case studies emerging from current biomedical research, the book will equip students with a robust understanding of medicinal chemistry, to prepare them for future success.Réservation
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Code-barres Cote Support Localisation Section Disponibilité 24/324412 L/615.082 Livre Bibliothèque Mathématique informatique et sciences de la matière indéterminé Exclu du prêt 24/324413 L/615.082 Livre Bibliothèque Mathématique informatique et sciences de la matière indéterminé Disponible
Titre : Mathematical Physics with Differential Equations Type de document : texte imprimé Auteurs : Yisong Yang, Auteur Editeur : Oxford University Press Année de publication : 2023 Importance : 564 p Format : 24 x 16 cm ISBN/ISSN/EAN : 978-0-19-287262-3 Langues : Anglais (eng) Résumé : Traditional literature in mathematical physics is clustered around classical mechanics, especially fluids and elasticity. This book reflects the modern development of theoretical physics in the areas of field theories: classical, quantum, and gravitational, in which differential equations play essential roles and offer powerful insight. Yang here presents a broad range of fundamental topics in theoretical and mathematical physics based on the viewpoint of differential equations.
The subject areas covered include classical and quantum many-body problems, thermodynamics, electromagnetism, magnetic monopoles, special relativity, gauge field theories, general relativity, superconductivity, vortices and other topological solitons, and canonical quantization of fields, for which knowledge and use of linear and nonlinear differential equations are essential for comprehension. Much emphasis is given to the mathematical and physical content offering an appreciation of the interplay of mathematics and theoretical physics from the viewpoint of differential equations. Advanced methods and techniques of modern nonlinear functional analysis are kept to a minimum and each chapter is supplemented with a collection of exercises of varied depths making it an ideal resource for students and researchers alike.Mathematical Physics with Differential Equations [texte imprimé] / Yisong Yang, Auteur . - [S.l.] : Oxford University Press, 2023 . - 564 p ; 24 x 16 cm.
ISBN : 978-0-19-287262-3
Langues : Anglais (eng)
Résumé : Traditional literature in mathematical physics is clustered around classical mechanics, especially fluids and elasticity. This book reflects the modern development of theoretical physics in the areas of field theories: classical, quantum, and gravitational, in which differential equations play essential roles and offer powerful insight. Yang here presents a broad range of fundamental topics in theoretical and mathematical physics based on the viewpoint of differential equations.
The subject areas covered include classical and quantum many-body problems, thermodynamics, electromagnetism, magnetic monopoles, special relativity, gauge field theories, general relativity, superconductivity, vortices and other topological solitons, and canonical quantization of fields, for which knowledge and use of linear and nonlinear differential equations are essential for comprehension. Much emphasis is given to the mathematical and physical content offering an appreciation of the interplay of mathematics and theoretical physics from the viewpoint of differential equations. Advanced methods and techniques of modern nonlinear functional analysis are kept to a minimum and each chapter is supplemented with a collection of exercises of varied depths making it an ideal resource for students and researchers alike.Réservation
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Code-barres Cote Support Localisation Section Disponibilité 24/324343 L/530.678 Livre Bibliothèque Mathématique informatique et sciences de la matière indéterminé Exclu du prêt 24/324344 L/530.678 Livre Bibliothèque Mathématique informatique et sciences de la matière indéterminé Disponible
Titre : Operator Theory by Example Type de document : texte imprimé Auteurs : Stephan Ramon Garcia, Auteur ; William T.Ross, Auteur ; Javad Mashreghi, Auteur Editeur : Oxford University Press Année de publication : 2023 Importance : 494 p Format : 24 x 16 cm ISBN/ISSN/EAN : 978-0-19-286387-4 Langues : Anglais (eng) Résumé : Aimed at graduate students, this textbook provides an accessible and comprehensive introduction to operator theory. Rather than discuss the subject in the abstract, this textbook covers the subject through twenty examples of a wide variety of operators, discussing the norm, spectrum, commutant, invariant subspaces, and interesting properties of each operator.
The text is supplemented by over 600 end-of-chapter exercises, designed to help the reader master the topics covered in the chapter, as well as providing an opportunity to further explore the vast operator theory literature. Each chapter also contains well-researched historical facts which place each chapter within the broader context of the development of the field as a whole.Note de contenu : 1 Hilbert Spaces
1.1 Euclidean Space
1.2 The Sequence Space l2
1.3 The Lebesgue Space L2[0, 1]
1.4 Abstract Hilbert Spaces
1.5 The Gram–Schmidt Process
1.6 Orthonormal Bases and Total Orthonormal Sets
1.7 Orthogonal Projections
1.8 Banach Spaces
1.9 Notes
1.10 Exercises
1.11 Hints for the Exercises
2 Diagonal Operators
2.1 Diagonal Operators
2.2 Banach-Space Interlude
2.3 Inverse of an Operator
2.4 Spectrum of an Operator
2.5 Compact Diagonal Operators
2.6 Compact Selfadjoint Operators
2.7 Notes
2.8 Exercises
2.9 Hints for the Exercises
3 Infinite Matrices
3.1 Adjoint of an Operator
3.2 Special Case of Schur's Test
3.3 Schur's Test
3.4 Compactness and Contractions
3.5 Notes
3.6 Exercises
3.7 Hints for the Exercises
4 Two Multiplication Operators
4.1 Mx on L2[0, 1]
4.2 Fourier Analysis
4.3 Mξ on L2(T)
4.4 Notes
4.5 Exercises
4.6 Hints for the Exercises
5 The Unilateral Shift
5.1 The Shift on l2
5.2 Adjoint of the Shift
5.3 The Hardy Space
5.4 Bounded Analytic Functions
5.5 Multipliers of H2
5.6 Commutant of the Shift
5.7 Cyclic Vectors
5.8 Notes
5.9 Exercises
5.10 Hints for the Exercises
6 The Cesà ro Operator
6.1 Cesà ro Summability
6.2 The Cesà ro Operator
6.3 Spectral Properties
6.4 Other Properties of the Cesà ro Operator
6.5 Other Versions of the Cesà ro Operator
6.6 Notes
6.7 Exercises
6.8 Hints for the Exercises
7 The Volterra Operator
7.1 Basic Facts
7.2 Norm, Spectrum, and Resolvent
7.3 Other Properties of the Volterra Operator
7.4 Invariant Subspaces
7.5 Commutant
7.6 Notes
7.7 Exercises
7.8 Hints for the Exercises
8 Multiplication Operators
8.1 Multipliers of Lebesgue Spaces
8.2 Cyclic Vectors
8.3 Commutant
8.4 Spectral Radius
8.5 Selfadjoint and Positive Operators
8.6 Continuous Functional Calculus
8.7 The Spectral Theorem
8.8 Revisiting Diagonal Operators
8.9 Notes
8.10 Exercises
8.11 Hints for the Exercises
9 The Dirichlet Shift
9.1 The Dirichlet Space
9.2 The Dirichlet Shift
9.3 The Dirichlet Shift is a 2-isometry
9.4 Multipliers and Commutant
9.5 Invariant Subspaces
9.6 Cyclic Vectors
9.7 The Bilateral Dirichlet Shift
9.8 Notes
9.9 Exercises
9.10 Hints for the Exercises
10 The Bergman Shift
10.1 The Bergman Space
10.2 The Bergman Shift
10.3 Invariant Subspaces
10.4 Invariant Subspaces of Higher Index
10.5 Multipliers and Commutant
10.6 Notes
10.7 Exercises
10.8 Hints for the Exercises
11 The Fourier Transform
11.1 The Fourier Transform on L1(R)
11.2 Convolution and Young's Inequality
11.3 Convolution and the Fourier Transform
11.4 The Poisson Kernel
11.5 The Fourier Inversion Formula
11.6 The Fourier–Plancherel Transform
11.7 Eigenvalues and Hermite Functions
11.8 The Hardy Space of the Upper Half-Plane
11.9 Notes
11.10 Exercises
11.11 Hints for the Exercises
12 The Hilbert Transform
12.1 The Poisson Integral on the Circle
12.2 The Hilbert Transform on the Circle
12.3 The Hilbert Transform on the Real Line
12.4 Notes
12.5 Exercises
12.6 Hints for the Exercises
13 Bishop Operators
13.1 The Invariant Subspace Problem
13.2 Lomonosov's Theorem
13.3 Universal Operators
13.4 Properties of Bishop Operators
13.5 Rational Case: Spectrum
13.6 Rational Case: Invariant Subspaces
13.7 Irrational Case
13.8 Notes
13.9 Exercises
13.10 Hints for the Exercises
14 Operator Matrices
14.1 Direct Sums of Hilbert Spaces
14.2 Block Operators
14.3 Invariant Subspaces
14.4 Inverses and Spectra
14.5 Idempotents
14.6 The Douglas Factorization Theorem
14.7 The Julia Operator of a Contraction
14.8 Parrott's Theorem
14.9 Polar Decomposition
14.10 Notes
14.11 Exercises
14.12 Hints for the Exercises
15 Constructions with the Shift Operator
15.1 The von Neumann–Wold Decomposition
15.2 The Sum of S and S*
15.3 The Direct Sum of S and S*
15.4 The Tensor Product of S and S*
15.5 Notes
15.6 Exercises
15.7 Hints for the Exercises
16 Toeplitz Operators
16.1 Toeplitz Matrices
16.2 The Riesz Projection
16.3 Toeplitz Operators
16.4 Selfadjoint and Compact Toeplitz Operators
16.5 The Brown–Halmos Characterization
16.6 Analytic and Co-analytic Symbols
16.7 Universal Toeplitz Operators
16.8 Notes
16.9 Exercises
16.10 Hints for the Exercises
17 Hankel Operators
17.1 The Hilbert Matrix
17.2 Doubly Infinite Hankel Matrices
17.3 Hankel Operators
17.4 The Norm of a Hankel Operator
17.5 Hilbert's Inequality
17.6 The Nehari Problem
17.7 The Carathéodory–Fejér Problem
17.8 The Nevanlinna–Pick Problem
17.9 Notes
17.10 Exercises
17.11 Hints for the Exercises
18 Composition Operators
18.1 A Motivating Example
18.2 Composition Operators on H2
18.3 Compact Composition Operators
18.4 Spectrum of a Composition Operator
18.5 Adjoint of a Composition Operator
18.6 Universal Operators and Composition Operators
18.7 Notes
18.8 Exercises
18.9 Hints for the Exercises
19 Subnormal Operators
19.1 Basics of Subnormal Operators
19.2 Cyclic Subnormal Operators
19.3 Subnormal Weighted Shifts
19.4 Invariant Subspaces
19.5 Notes
19.6 Exercises
19.7 Hints for the Exercises
20 The Compressed Shift
20.1 Model Spaces
20.2 From a Model Space to L2[0, 1]
20.3 The Compressed Shift
20.4 A Connection to the Volterra Operator
20.5 A Basis for the Model Space
20.6 A Matrix Representation
20.7 Notes
20.8 Exercises
20.9 Hints for the ExercisesOperator Theory by Example [texte imprimé] / Stephan Ramon Garcia, Auteur ; William T.Ross, Auteur ; Javad Mashreghi, Auteur . - [S.l.] : Oxford University Press, 2023 . - 494 p ; 24 x 16 cm.
ISBN : 978-0-19-286387-4
Langues : Anglais (eng)
Résumé : Aimed at graduate students, this textbook provides an accessible and comprehensive introduction to operator theory. Rather than discuss the subject in the abstract, this textbook covers the subject through twenty examples of a wide variety of operators, discussing the norm, spectrum, commutant, invariant subspaces, and interesting properties of each operator.
The text is supplemented by over 600 end-of-chapter exercises, designed to help the reader master the topics covered in the chapter, as well as providing an opportunity to further explore the vast operator theory literature. Each chapter also contains well-researched historical facts which place each chapter within the broader context of the development of the field as a whole.Note de contenu : 1 Hilbert Spaces
1.1 Euclidean Space
1.2 The Sequence Space l2
1.3 The Lebesgue Space L2[0, 1]
1.4 Abstract Hilbert Spaces
1.5 The Gram–Schmidt Process
1.6 Orthonormal Bases and Total Orthonormal Sets
1.7 Orthogonal Projections
1.8 Banach Spaces
1.9 Notes
1.10 Exercises
1.11 Hints for the Exercises
2 Diagonal Operators
2.1 Diagonal Operators
2.2 Banach-Space Interlude
2.3 Inverse of an Operator
2.4 Spectrum of an Operator
2.5 Compact Diagonal Operators
2.6 Compact Selfadjoint Operators
2.7 Notes
2.8 Exercises
2.9 Hints for the Exercises
3 Infinite Matrices
3.1 Adjoint of an Operator
3.2 Special Case of Schur's Test
3.3 Schur's Test
3.4 Compactness and Contractions
3.5 Notes
3.6 Exercises
3.7 Hints for the Exercises
4 Two Multiplication Operators
4.1 Mx on L2[0, 1]
4.2 Fourier Analysis
4.3 Mξ on L2(T)
4.4 Notes
4.5 Exercises
4.6 Hints for the Exercises
5 The Unilateral Shift
5.1 The Shift on l2
5.2 Adjoint of the Shift
5.3 The Hardy Space
5.4 Bounded Analytic Functions
5.5 Multipliers of H2
5.6 Commutant of the Shift
5.7 Cyclic Vectors
5.8 Notes
5.9 Exercises
5.10 Hints for the Exercises
6 The Cesà ro Operator
6.1 Cesà ro Summability
6.2 The Cesà ro Operator
6.3 Spectral Properties
6.4 Other Properties of the Cesà ro Operator
6.5 Other Versions of the Cesà ro Operator
6.6 Notes
6.7 Exercises
6.8 Hints for the Exercises
7 The Volterra Operator
7.1 Basic Facts
7.2 Norm, Spectrum, and Resolvent
7.3 Other Properties of the Volterra Operator
7.4 Invariant Subspaces
7.5 Commutant
7.6 Notes
7.7 Exercises
7.8 Hints for the Exercises
8 Multiplication Operators
8.1 Multipliers of Lebesgue Spaces
8.2 Cyclic Vectors
8.3 Commutant
8.4 Spectral Radius
8.5 Selfadjoint and Positive Operators
8.6 Continuous Functional Calculus
8.7 The Spectral Theorem
8.8 Revisiting Diagonal Operators
8.9 Notes
8.10 Exercises
8.11 Hints for the Exercises
9 The Dirichlet Shift
9.1 The Dirichlet Space
9.2 The Dirichlet Shift
9.3 The Dirichlet Shift is a 2-isometry
9.4 Multipliers and Commutant
9.5 Invariant Subspaces
9.6 Cyclic Vectors
9.7 The Bilateral Dirichlet Shift
9.8 Notes
9.9 Exercises
9.10 Hints for the Exercises
10 The Bergman Shift
10.1 The Bergman Space
10.2 The Bergman Shift
10.3 Invariant Subspaces
10.4 Invariant Subspaces of Higher Index
10.5 Multipliers and Commutant
10.6 Notes
10.7 Exercises
10.8 Hints for the Exercises
11 The Fourier Transform
11.1 The Fourier Transform on L1(R)
11.2 Convolution and Young's Inequality
11.3 Convolution and the Fourier Transform
11.4 The Poisson Kernel
11.5 The Fourier Inversion Formula
11.6 The Fourier–Plancherel Transform
11.7 Eigenvalues and Hermite Functions
11.8 The Hardy Space of the Upper Half-Plane
11.9 Notes
11.10 Exercises
11.11 Hints for the Exercises
12 The Hilbert Transform
12.1 The Poisson Integral on the Circle
12.2 The Hilbert Transform on the Circle
12.3 The Hilbert Transform on the Real Line
12.4 Notes
12.5 Exercises
12.6 Hints for the Exercises
13 Bishop Operators
13.1 The Invariant Subspace Problem
13.2 Lomonosov's Theorem
13.3 Universal Operators
13.4 Properties of Bishop Operators
13.5 Rational Case: Spectrum
13.6 Rational Case: Invariant Subspaces
13.7 Irrational Case
13.8 Notes
13.9 Exercises
13.10 Hints for the Exercises
14 Operator Matrices
14.1 Direct Sums of Hilbert Spaces
14.2 Block Operators
14.3 Invariant Subspaces
14.4 Inverses and Spectra
14.5 Idempotents
14.6 The Douglas Factorization Theorem
14.7 The Julia Operator of a Contraction
14.8 Parrott's Theorem
14.9 Polar Decomposition
14.10 Notes
14.11 Exercises
14.12 Hints for the Exercises
15 Constructions with the Shift Operator
15.1 The von Neumann–Wold Decomposition
15.2 The Sum of S and S*
15.3 The Direct Sum of S and S*
15.4 The Tensor Product of S and S*
15.5 Notes
15.6 Exercises
15.7 Hints for the Exercises
16 Toeplitz Operators
16.1 Toeplitz Matrices
16.2 The Riesz Projection
16.3 Toeplitz Operators
16.4 Selfadjoint and Compact Toeplitz Operators
16.5 The Brown–Halmos Characterization
16.6 Analytic and Co-analytic Symbols
16.7 Universal Toeplitz Operators
16.8 Notes
16.9 Exercises
16.10 Hints for the Exercises
17 Hankel Operators
17.1 The Hilbert Matrix
17.2 Doubly Infinite Hankel Matrices
17.3 Hankel Operators
17.4 The Norm of a Hankel Operator
17.5 Hilbert's Inequality
17.6 The Nehari Problem
17.7 The Carathéodory–Fejér Problem
17.8 The Nevanlinna–Pick Problem
17.9 Notes
17.10 Exercises
17.11 Hints for the Exercises
18 Composition Operators
18.1 A Motivating Example
18.2 Composition Operators on H2
18.3 Compact Composition Operators
18.4 Spectrum of a Composition Operator
18.5 Adjoint of a Composition Operator
18.6 Universal Operators and Composition Operators
18.7 Notes
18.8 Exercises
18.9 Hints for the Exercises
19 Subnormal Operators
19.1 Basics of Subnormal Operators
19.2 Cyclic Subnormal Operators
19.3 Subnormal Weighted Shifts
19.4 Invariant Subspaces
19.5 Notes
19.6 Exercises
19.7 Hints for the Exercises
20 The Compressed Shift
20.1 Model Spaces
20.2 From a Model Space to L2[0, 1]
20.3 The Compressed Shift
20.4 A Connection to the Volterra Operator
20.5 A Basis for the Model Space
20.6 A Matrix Representation
20.7 Notes
20.8 Exercises
20.9 Hints for the ExercisesRéservation
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Titre : Supramolecular Chemistry : Fundamentals and Applications Type de document : texte imprimé Auteurs : Paul D. Beer, Auteur ; Timothy A. Barendt, Auteur ; Jason Y.C.Lim, Auteur Mention d'édition : 2éd Editeur : Oxford University Press Année de publication : 2022 Importance : 182p Format : 24,5x19 cm ISBN/ISSN/EAN : 978-0-19-883284-3 Langues : Anglais (eng) Index. décimale : 547 Chimie organique : classer la biochimie à 574.192 Résumé : The renowned Oxford Chemistry Primers series, which provides focused introductions to a range of important topics in chemistry, has been refreshed and updated to suit the needs of today''s students, lecturers, and postgraduate researchers. The rigorous, yet accessible, treatment of each subject area is ideal for those wanting a primer in a given topic to prepare them for more advanced study or research. Moreover, cutting-edge examples and applications throughout the texts show the relevance of the chemistry being described to current research and industry.The learning features provided, including questions at the end of every chapter and online multiple-choice questions, encourage active learning and promote understanding. Furthermore, frequent diagrams, margin notes, further reading, and glossary definitions all help to enhance a student''s understanding of these essential areas of chemistry.Supramolecular Chemistry provides a concise and fully-illustrated introduction to one of the fundamental areas of modern chemical research, the concepts of which are essential to understanding interactions between molecules.The primer is supported by online resources and is available for students and institutions to purchase in a variety of formats.The e-book offers a mobile experience and convenient access along with functionality tools, navigation features and links that offer extra learning support: www.oxfordtextbooks.co.uk/ebooks Supramolecular Chemistry : Fundamentals and Applications [texte imprimé] / Paul D. Beer, Auteur ; Timothy A. Barendt, Auteur ; Jason Y.C.Lim, Auteur . - 2éd . - [S.l.] : Oxford University Press, 2022 . - 182p ; 24,5x19 cm.
ISBN : 978-0-19-883284-3
Langues : Anglais (eng)
Index. décimale : 547 Chimie organique : classer la biochimie à 574.192 Résumé : The renowned Oxford Chemistry Primers series, which provides focused introductions to a range of important topics in chemistry, has been refreshed and updated to suit the needs of today''s students, lecturers, and postgraduate researchers. The rigorous, yet accessible, treatment of each subject area is ideal for those wanting a primer in a given topic to prepare them for more advanced study or research. Moreover, cutting-edge examples and applications throughout the texts show the relevance of the chemistry being described to current research and industry.The learning features provided, including questions at the end of every chapter and online multiple-choice questions, encourage active learning and promote understanding. Furthermore, frequent diagrams, margin notes, further reading, and glossary definitions all help to enhance a student''s understanding of these essential areas of chemistry.Supramolecular Chemistry provides a concise and fully-illustrated introduction to one of the fundamental areas of modern chemical research, the concepts of which are essential to understanding interactions between molecules.The primer is supported by online resources and is available for students and institutions to purchase in a variety of formats.The e-book offers a mobile experience and convenient access along with functionality tools, navigation features and links that offer extra learning support: www.oxfordtextbooks.co.uk/ebooks Réservation
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