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Titre : Advanced Problem Solving Using Maple : Applied Mathematics, Operations Research, Business Analytics, and Decision Analysis Type de document : texte imprimé Auteurs : William P.Fox, Auteur Editeur : Chapman & Hall/CRC Année de publication : 2022 Importance : 390 p Format : 24 x 16 cm ISBN/ISSN/EAN : 978-1-03-247428-1 Langues : Anglais (eng) Résumé : Advanced Problem Solving Using Maple™: Applied Mathematics, Operations Research, Business Analytics, and Decision Analysis applies the mathematical modeling process by formulating, building, solving, analyzing, and criticizing mathematical models. Scenarios are developed within the scope of the problem-solving process.
The text focuses on discrete dynamical systems, optimization techniques, single-variable unconstrained optimization and applied problems, and numerical search methods. Additional coverage includes multivariable unconstrained and constrained techniques. Linear algebra techniques to model and solve problems such as the Leontief model, and advanced regression techniques including nonlinear, logistics, and Poisson are covered. Game theory, the Nash equilibrium, and Nash arbitration are also included.
Features:
The text’s case studies and student projects involve students with real-world problem solving
Focuse on numerical solution techniques in dynamical systems, optimization, and numerical analysis
The numerical procedures discussed in the text are algorithmic and iterative
Maple is utilized throughout the text as a tool for computation and analysis
All algorithms are provided with step-by-step formats
Advanced Problem Solving Using Maple : Applied Mathematics, Operations Research, Business Analytics, and Decision Analysis [texte imprimé] / William P.Fox, Auteur . - [S.l.] : Chapman & Hall/CRC, 2022 . - 390 p ; 24 x 16 cm.
ISBN : 978-1-03-247428-1
Langues : Anglais (eng)
Résumé : Advanced Problem Solving Using Maple™: Applied Mathematics, Operations Research, Business Analytics, and Decision Analysis applies the mathematical modeling process by formulating, building, solving, analyzing, and criticizing mathematical models. Scenarios are developed within the scope of the problem-solving process.
The text focuses on discrete dynamical systems, optimization techniques, single-variable unconstrained optimization and applied problems, and numerical search methods. Additional coverage includes multivariable unconstrained and constrained techniques. Linear algebra techniques to model and solve problems such as the Leontief model, and advanced regression techniques including nonlinear, logistics, and Poisson are covered. Game theory, the Nash equilibrium, and Nash arbitration are also included.
Features:
The text’s case studies and student projects involve students with real-world problem solving
Focuse on numerical solution techniques in dynamical systems, optimization, and numerical analysis
The numerical procedures discussed in the text are algorithmic and iterative
Maple is utilized throughout the text as a tool for computation and analysis
All algorithms are provided with step-by-step formats
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Titre : A First Course in Ergodic Theory Type de document : texte imprimé Auteurs : Karma Dajani, Auteur ; Charlene Kalle, Auteur Editeur : Chapman & Hall/CRC Année de publication : 2021 Importance : 253 p Format : 24 x 16 cm ISBN/ISSN/EAN : 978-1-03-202184-3 Langues : Anglais (eng) Résumé : A First Course in Ergodic Theory provides readers with an introductory course in Ergodic Theory. This textbook has been developed from the authors’ own notes on the subject, which they have been teaching since the 1990s. Over the years they have added topics, theorems, examples and explanations from various sources. The result is a book that is easy to teach from and easy to learn from — designed to require only minimal prerequisites.
Features
Suitable for readers with only a basic knowledge of measure theory, some topology and a very basic knowledge of functional analysis
Perfect as the primary textbook for a course in Ergodic Theory
Examples are described and are studied in detail when new properties are presented.Note de contenu : Preface. Author Bios. 1. Measure preservingness and basic examples. 1.1. What is Ergodic Theory. 1.2. Measure Preserving Transformations. 1.3. Basic Examples. 2. Recurrence and Ergodicity. 2.1. Recurrence. 2.2. Ergodicity. 2.3. Examples of Ergodic Transformations. 3. The Pointwise Ergodic Theorem and its consequences. 3.2. Normal Numbers. 3.3. Characterization of Irreducible Markov Chains. 3.4. Mixing. 4. More Ergodic Theorem. The mean Ergodic Theorem. 4.2. The Hurewicz Erogdic Theorem. 5. Measure Preserving Isomorphisms. 5.2. Factor Maps. 5.3. Natural Extensions. 6. The Perron–Frobenius Operator. 6.1. Absolutely Continuous Invariants Measures. 6.2. Exactness. Densities for Piecewise Monotnoe Interval Maps. 7. Invariant Measures for Continuous Transformations. 7.1. Existence. 7.2. Unique Ergodicity and Inform Distributions. 7.3. Some Topological Dynamics. 8. Continued Fractions. 8.1. Basic Properties of Regular Continue Fractions. 8.2. Ergodic Properties of Gauss Map. 8.3. Natural Extension and the Doeblin–Lenstra Conjecture. 8.4. Other Continue Fraction Transformation. 9. Entropy. 9.1. Randomness and Information. 9.2. Definitions and Properties. Calculation of Entropy and Examples. 9.4. The Shannon–McMillan–Breiman Theorem. 9.5. Lochs’ Theorem. 10. The Variational Principle. 10.1 Topological Entropy. 10.2. Main Theorem. 10.3. Measures of Maximal Entropy. 11. Infinite Ergodic Theory. 11.1 Examples of Infinite Measure Dynamical Systems. 11.2. Conservative and Dissipative Part. 11.3. Induced Systems. 11.4. Jump Transformations. 11.5. Ergodic Theorem for Infinite Measure Systems. 12. Appendix. 12.1. Topology. 12.2. Measure Theory. 12.3 Lebesgue Spaces. 12.4. Lebesgue Integration and Convergence Results. 12.5. Hilbert’s Spaces. 12.6. Borel Measures on Compact Metric Spaces. 12.7. Functions of Bounded Variation. Bibliography. Index.
A First Course in Ergodic Theory [texte imprimé] / Karma Dajani, Auteur ; Charlene Kalle, Auteur . - [S.l.] : Chapman & Hall/CRC, 2021 . - 253 p ; 24 x 16 cm.
ISBN : 978-1-03-202184-3
Langues : Anglais (eng)
Résumé : A First Course in Ergodic Theory provides readers with an introductory course in Ergodic Theory. This textbook has been developed from the authors’ own notes on the subject, which they have been teaching since the 1990s. Over the years they have added topics, theorems, examples and explanations from various sources. The result is a book that is easy to teach from and easy to learn from — designed to require only minimal prerequisites.
Features
Suitable for readers with only a basic knowledge of measure theory, some topology and a very basic knowledge of functional analysis
Perfect as the primary textbook for a course in Ergodic Theory
Examples are described and are studied in detail when new properties are presented.Note de contenu : Preface. Author Bios. 1. Measure preservingness and basic examples. 1.1. What is Ergodic Theory. 1.2. Measure Preserving Transformations. 1.3. Basic Examples. 2. Recurrence and Ergodicity. 2.1. Recurrence. 2.2. Ergodicity. 2.3. Examples of Ergodic Transformations. 3. The Pointwise Ergodic Theorem and its consequences. 3.2. Normal Numbers. 3.3. Characterization of Irreducible Markov Chains. 3.4. Mixing. 4. More Ergodic Theorem. The mean Ergodic Theorem. 4.2. The Hurewicz Erogdic Theorem. 5. Measure Preserving Isomorphisms. 5.2. Factor Maps. 5.3. Natural Extensions. 6. The Perron–Frobenius Operator. 6.1. Absolutely Continuous Invariants Measures. 6.2. Exactness. Densities for Piecewise Monotnoe Interval Maps. 7. Invariant Measures for Continuous Transformations. 7.1. Existence. 7.2. Unique Ergodicity and Inform Distributions. 7.3. Some Topological Dynamics. 8. Continued Fractions. 8.1. Basic Properties of Regular Continue Fractions. 8.2. Ergodic Properties of Gauss Map. 8.3. Natural Extension and the Doeblin–Lenstra Conjecture. 8.4. Other Continue Fraction Transformation. 9. Entropy. 9.1. Randomness and Information. 9.2. Definitions and Properties. Calculation of Entropy and Examples. 9.4. The Shannon–McMillan–Breiman Theorem. 9.5. Lochs’ Theorem. 10. The Variational Principle. 10.1 Topological Entropy. 10.2. Main Theorem. 10.3. Measures of Maximal Entropy. 11. Infinite Ergodic Theory. 11.1 Examples of Infinite Measure Dynamical Systems. 11.2. Conservative and Dissipative Part. 11.3. Induced Systems. 11.4. Jump Transformations. 11.5. Ergodic Theorem for Infinite Measure Systems. 12. Appendix. 12.1. Topology. 12.2. Measure Theory. 12.3 Lebesgue Spaces. 12.4. Lebesgue Integration and Convergence Results. 12.5. Hilbert’s Spaces. 12.6. Borel Measures on Compact Metric Spaces. 12.7. Functions of Bounded Variation. Bibliography. Index.
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Code-barres Cote Support Localisation Section Disponibilité 24/324479 L/515.164 Livre Bibliothèque Mathématique informatique et sciences de la matière indéterminé Disponible 24/324478 L/515.164 Livre Bibliothèque Mathématique informatique et sciences de la matière indéterminé Exclu du prêt
Titre : Multivariable Calculus with Mathematica Type de document : texte imprimé Auteurs : Robert P. Gilbert, Auteur ; Michael Shoushani, Auteur ; Yvonne Ou, Auteur Editeur : Chapman & Hall/CRC Année de publication : 2022 Importance : 418 p Format : 24 x 16 cm ISBN/ISSN/EAN : 978-0-367-62303-6 Langues : Anglais (eng) Résumé : Multivariable Calculus with Mathematica is a textbook addressing the calculus of several variables. Instead of just using Mathematica to directly solve problems, the students are encouraged to learn the syntax and to write their own code to solve problems. This not only encourages scientific computing skills but at the same time stresses the complete understanding of the mathematics. Questions are provided at the end of the chapters to test the student’s theoretical understanding of the mathematics, and there are also computer algebra questions which test the student’s ability to apply their knowledge in non-trivial ways.
Features
Ensures that students are not just using the package to directly solve problems, but learning the syntax to write their own code to solve problems
Suitable as a main textbook for a Calculus III course, and as a supplementary text for topics scientific computing, engineering, and mathematical physics
Written in a style that engages the students’ interest and encourages the understanding of the mathematical ideasNote de contenu : 1. Vectors in Rᶟ. 2. Some Elementary Curves and Surfaces in Rᶟ. 3. Functions of Several Variables. 4. Directional Derivatives and Extremum Problems. 5. Multiple Integrals. 6. Vector Calculus. 7. Elements of Tenor Analysis. 8. Partial Differential Equations. Multivariable Calculus with Mathematica [texte imprimé] / Robert P. Gilbert, Auteur ; Michael Shoushani, Auteur ; Yvonne Ou, Auteur . - [S.l.] : Chapman & Hall/CRC, 2022 . - 418 p ; 24 x 16 cm.
ISBN : 978-0-367-62303-6
Langues : Anglais (eng)
Résumé : Multivariable Calculus with Mathematica is a textbook addressing the calculus of several variables. Instead of just using Mathematica to directly solve problems, the students are encouraged to learn the syntax and to write their own code to solve problems. This not only encourages scientific computing skills but at the same time stresses the complete understanding of the mathematics. Questions are provided at the end of the chapters to test the student’s theoretical understanding of the mathematics, and there are also computer algebra questions which test the student’s ability to apply their knowledge in non-trivial ways.
Features
Ensures that students are not just using the package to directly solve problems, but learning the syntax to write their own code to solve problems
Suitable as a main textbook for a Calculus III course, and as a supplementary text for topics scientific computing, engineering, and mathematical physics
Written in a style that engages the students’ interest and encourages the understanding of the mathematical ideasNote de contenu : 1. Vectors in Rᶟ. 2. Some Elementary Curves and Surfaces in Rᶟ. 3. Functions of Several Variables. 4. Directional Derivatives and Extremum Problems. 5. Multiple Integrals. 6. Vector Calculus. 7. Elements of Tenor Analysis. 8. Partial Differential Equations. Réservation
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