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Título : Symbolic Integration I : Transcendental Functions Tipo de documento: documento electrónico Autores: Manuel Bronstein ; SpringerLink (Online service) Editorial: Berlin, Heidelberg : Springer Berlin Heidelberg Fecha de publicación: 2005 Colección: Algorithms and Computation in Mathematics, ISSN 1431-1550 num. 1 Número de páginas: XV, 325 p Il.: online resource ISBN/ISSN/DL: 978-3-540-26842-0 Idioma : Inglés (eng) Palabras clave: Mathematics Computers Computer science Algebra Mathematical analysis Analysis (Mathematics) Algorithms Theory of Computation Symbolic and Algebraic Manipulation Clasificación: 51 Matemáticas Resumen: This first volume in the series "Algorithms and Computation in Mathematics" is destined to become the standard reference work in the field. Manuel Bronstein is a leading expert on this topic and his book is the first to treat the subject both comprehensively and in sufficient detail - incorporating new results along the way. The book addresses mathematicians and computer scientists interested in symbolic computation, developers and programmers of computer algebra systems as well as users of symbolic integration methods. Many algorithms are given in pseudocode ready for immediate implementation, making the book equally suitable as a textbook for lecture courses on symbolic integration. This second edition offers a new chapter on parallel integration, as well as a few comments on obtaining continuous antiderivatives and additional exercises. From the Reviews "The goal of this well-written book is to present the state of the art in the domain of "integration in finite terms". ... Both aspects of the work, mathematics and implementation, are present in the book. Moreover, Bronstein has chosen a good level of detail, and in such a way that he only deals with the case of transcendental functions. ..." J.M.Ollagnier, Mathematical Reviews 2002 "... It makes an excellent textbook for courses in computer algebra. It contains many exercises and the algorithms are presented in pseudocode, which is easy to implement in any computer algebra system. For those interested in symbolic integration it will become the standard reference." N.A.van Arkel, Medelingen van het wiskundig genootschap 1998 "... The writing is excellent, and the author provides a clear and coherent treatment of the problem of symbolic integration of transcendental functions. Each chapter includes several worked examples and a list of additional exercises. Every researcher and teacher in symbolic computation should have access to this book." F.Winkler, Computing Reviews 1997 "My first thought on seeing this book was "I wish I had written it" - it resembles my lecture notes on the subject, but is better and more complete. ... In sum, the book does what it sets out to do, does it well, and should be on the bookshelf of every implementer or teacher." J.Davenport, The SAC Newsletter 2, 1997 Nota de contenido: Algebraic Preliminaries -- Integration of Rational Functions -- Differential Fields -- The Order Function -- Integration of Transcendental Functions -- The Risch Differential Equation -- Parametric Problems -- The Coupled Differential System -- Structure Theorems -- Parallel Integration En línea: http://dx.doi.org/10.1007/b138171 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=35252 Symbolic Integration I : Transcendental Functions [documento electrónico] / Manuel Bronstein ; SpringerLink (Online service) . - Berlin, Heidelberg : Springer Berlin Heidelberg, 2005 . - XV, 325 p : online resource. - (Algorithms and Computation in Mathematics, ISSN 1431-1550; 1) .
ISBN : 978-3-540-26842-0
Idioma : Inglés (eng)
Palabras clave: Mathematics Computers Computer science Algebra Mathematical analysis Analysis (Mathematics) Algorithms Theory of Computation Symbolic and Algebraic Manipulation Clasificación: 51 Matemáticas Resumen: This first volume in the series "Algorithms and Computation in Mathematics" is destined to become the standard reference work in the field. Manuel Bronstein is a leading expert on this topic and his book is the first to treat the subject both comprehensively and in sufficient detail - incorporating new results along the way. The book addresses mathematicians and computer scientists interested in symbolic computation, developers and programmers of computer algebra systems as well as users of symbolic integration methods. Many algorithms are given in pseudocode ready for immediate implementation, making the book equally suitable as a textbook for lecture courses on symbolic integration. This second edition offers a new chapter on parallel integration, as well as a few comments on obtaining continuous antiderivatives and additional exercises. From the Reviews "The goal of this well-written book is to present the state of the art in the domain of "integration in finite terms". ... Both aspects of the work, mathematics and implementation, are present in the book. Moreover, Bronstein has chosen a good level of detail, and in such a way that he only deals with the case of transcendental functions. ..." J.M.Ollagnier, Mathematical Reviews 2002 "... It makes an excellent textbook for courses in computer algebra. It contains many exercises and the algorithms are presented in pseudocode, which is easy to implement in any computer algebra system. For those interested in symbolic integration it will become the standard reference." N.A.van Arkel, Medelingen van het wiskundig genootschap 1998 "... The writing is excellent, and the author provides a clear and coherent treatment of the problem of symbolic integration of transcendental functions. Each chapter includes several worked examples and a list of additional exercises. Every researcher and teacher in symbolic computation should have access to this book." F.Winkler, Computing Reviews 1997 "My first thought on seeing this book was "I wish I had written it" - it resembles my lecture notes on the subject, but is better and more complete. ... In sum, the book does what it sets out to do, does it well, and should be on the bookshelf of every implementer or teacher." J.Davenport, The SAC Newsletter 2, 1997 Nota de contenido: Algebraic Preliminaries -- Integration of Rational Functions -- Differential Fields -- The Order Function -- Integration of Transcendental Functions -- The Risch Differential Equation -- Parametric Problems -- The Coupled Differential System -- Structure Theorems -- Parallel Integration En línea: http://dx.doi.org/10.1007/b138171 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=35252 Ejemplares
Signatura Medio Ubicación Sub-localización Sección Estado ningún ejemplar Solving Polynomial Equations / SpringerLink (Online service) ; Manuel Bronstein ; Arjeh M. Cohen ; Henri Cohen ; David Eisenbud ; Sturmfels, Bernd ; Alicia Dickenstein ; Ioannis Z. Emiris (2005)
Título : Solving Polynomial Equations : Foundations, Algorithms, and Applications Tipo de documento: documento electrónico Autores: SpringerLink (Online service) ; Manuel Bronstein ; Arjeh M. Cohen ; Henri Cohen ; David Eisenbud ; Sturmfels, Bernd ; Alicia Dickenstein ; Ioannis Z. Emiris Editorial: Berlin, Heidelberg : Springer Berlin Heidelberg Fecha de publicación: 2005 Colección: Algorithms and Computation in Mathematics, ISSN 1431-1550 num. 14 Número de páginas: XIV, 426 p. 44 illus., 11 illus. in color Il.: online resource ISBN/ISSN/DL: 978-3-540-27357-8 Idioma : Inglés (eng) Palabras clave: Mathematics Computer science Algebra Algorithms Symbolic and Algebraic Manipulation Clasificación: 51 Matemáticas Resumen: The subject of this book is the solution of polynomial equations, that is, s- tems of (generally) non-linear algebraic equations. This study is at the heart of several areas of mathematics and its applications. It has provided the - tivation for advances in di?erent branches of mathematics such as algebra, geometry, topology, and numerical analysis. In recent years, an explosive - velopment of algorithms and software has made it possible to solve many problems which had been intractable up to then and greatly expanded the areas of applications to include robotics, machine vision, signal processing, structural molecular biology, computer-aided design and geometric modelling, as well as certain areas of statistics, optimization and game theory, and b- logical networks. At the same time, symbolic computation has proved to be an invaluable tool for experimentation and conjecture in pure mathematics. As a consequence, the interest in e?ective algebraic geometry and computer algebrahasextendedwellbeyonditsoriginalconstituencyofpureandapplied mathematicians and computer scientists, to encompass many other scientists and engineers. While the core of the subject remains algebraic geometry, it also calls upon many other aspects of mathematics and theoretical computer science, ranging from numerical methods, di?erential equations and number theory to discrete geometry, combinatorics and complexity theory. Thegoalofthisbookistoprovideageneralintroduction tomodernma- ematical aspects in computing with multivariate polynomials and in solving algebraic systems Nota de contenido: to residues and resultants -- Solving equations via algebras -- Symbolic-numeric methods for solving polynomial equations and applications -- An algebraist’s view on border bases -- Tools for computing primary decompositions and applications to ideals associated to Bayesian networks -- Algorithms and their complexities -- Toric resultants and applications to geometric modelling -- to numerical algebraic geometry -- Four lectures on polynomial absolute factorization En línea: http://dx.doi.org/10.1007/b138957 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=35276 Solving Polynomial Equations : Foundations, Algorithms, and Applications [documento electrónico] / SpringerLink (Online service) ; Manuel Bronstein ; Arjeh M. Cohen ; Henri Cohen ; David Eisenbud ; Sturmfels, Bernd ; Alicia Dickenstein ; Ioannis Z. Emiris . - Berlin, Heidelberg : Springer Berlin Heidelberg, 2005 . - XIV, 426 p. 44 illus., 11 illus. in color : online resource. - (Algorithms and Computation in Mathematics, ISSN 1431-1550; 14) .
ISBN : 978-3-540-27357-8
Idioma : Inglés (eng)
Palabras clave: Mathematics Computer science Algebra Algorithms Symbolic and Algebraic Manipulation Clasificación: 51 Matemáticas Resumen: The subject of this book is the solution of polynomial equations, that is, s- tems of (generally) non-linear algebraic equations. This study is at the heart of several areas of mathematics and its applications. It has provided the - tivation for advances in di?erent branches of mathematics such as algebra, geometry, topology, and numerical analysis. In recent years, an explosive - velopment of algorithms and software has made it possible to solve many problems which had been intractable up to then and greatly expanded the areas of applications to include robotics, machine vision, signal processing, structural molecular biology, computer-aided design and geometric modelling, as well as certain areas of statistics, optimization and game theory, and b- logical networks. At the same time, symbolic computation has proved to be an invaluable tool for experimentation and conjecture in pure mathematics. As a consequence, the interest in e?ective algebraic geometry and computer algebrahasextendedwellbeyonditsoriginalconstituencyofpureandapplied mathematicians and computer scientists, to encompass many other scientists and engineers. While the core of the subject remains algebraic geometry, it also calls upon many other aspects of mathematics and theoretical computer science, ranging from numerical methods, di?erential equations and number theory to discrete geometry, combinatorics and complexity theory. Thegoalofthisbookistoprovideageneralintroduction tomodernma- ematical aspects in computing with multivariate polynomials and in solving algebraic systems Nota de contenido: to residues and resultants -- Solving equations via algebras -- Symbolic-numeric methods for solving polynomial equations and applications -- An algebraist’s view on border bases -- Tools for computing primary decompositions and applications to ideals associated to Bayesian networks -- Algorithms and their complexities -- Toric resultants and applications to geometric modelling -- to numerical algebraic geometry -- Four lectures on polynomial absolute factorization En línea: http://dx.doi.org/10.1007/b138957 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=35276 Ejemplares
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Título : The Mathematica GuideBook for Symbolics Tipo de documento: documento electrónico Autores: Trott, Michael ; SpringerLink (Online service) Editorial: New York, NY : Springer New York Fecha de publicación: 2006 Número de páginas: LV, 1454 p Il.: online resource ISBN/ISSN/DL: 978-0-387-28815-4 Idioma : Inglés (eng) Palabras clave: Mathematics Computer science Algorithms mathematics software Mathematical Software Symbolic and Algebraic Manipulation Computational Science Engineering Clasificación: 51 Matemáticas Resumen: Mathematica is today's most advanced technical computing system. It features a rich programming environment, two-and three-dimensional graphics capabilities and hundreds of sophisticated, powerful programming and mathematical functions using state-of-the-art algorithms. Combined with a user-friendly interface, and a complete mathematical typesetting system, Mathematica offers an intuitive easy-to-handle environment of great power and utility. "The Mathematica GuideBook for Symbolics" (code and text fully tailored for Mathematica 5.1) deals with Mathematica's symbolic mathematical capabilities. Structural and mathematical operations on single and systems of polynomials are fundamental to many symbolic calculations and they are covered in considerable detail. The solution of equations and differential equations, as well as the classical calculus operations (differentiation, integration, summation, series expansion, limits) are exhaustively treated. Generalized functions and their uses are discussed. In addition, this volume discusses and employs the classical orthogonal polynomials and special functions of mathematical physics. To demonstrate the symbolic mathematics power, a large variety of problems from mathematics and phyics are discussed Nota de contenido: Introduction and Orientation -- I. Symbolic computations: Remarks -- Manipulation of polynomials -- Manipulations of rational functions of polynomials -- Manipulations of trigonometric expressions -- Systems of linear and nonlinear equations -- Classical analysis -- Differential equations -- Integral transforms and generalized functions -- Three applications -- Overview -- II Classical orthogonal polynomials: Remarks -- General properties of orthogonal polynomials -- Hermite polynomials -- Jacobi polynomials -- Gegenbauer polynomials -- Laguerre polynomials -- Legendre polynomials -- Chebyshev polynomials T -- Chebyshev polynomials U -- Relationships among the orthogonal polynomials -- Overview -- III Classical special functions: Remarks/Introduction -- Gamma, beta, and polygamma functions -- Error functions and Fresnel integrals -- Sine, cosine, exponential, and logarithmic integral functions -- Bessel and airy functions -- Legendre functions -- Hypergeometric functions -- Elliptic integrals -- Elliptic functions -- ProductLog function -- Mathieu functions -- Additional special functions -- Solution of quintics with hypergeometric functions -- Overview -- Index En línea: http://dx.doi.org/10.1007/0-387-28815-5 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=34755 The Mathematica GuideBook for Symbolics [documento electrónico] / Trott, Michael ; SpringerLink (Online service) . - New York, NY : Springer New York, 2006 . - LV, 1454 p : online resource.
ISBN : 978-0-387-28815-4
Idioma : Inglés (eng)
Palabras clave: Mathematics Computer science Algorithms mathematics software Mathematical Software Symbolic and Algebraic Manipulation Computational Science Engineering Clasificación: 51 Matemáticas Resumen: Mathematica is today's most advanced technical computing system. It features a rich programming environment, two-and three-dimensional graphics capabilities and hundreds of sophisticated, powerful programming and mathematical functions using state-of-the-art algorithms. Combined with a user-friendly interface, and a complete mathematical typesetting system, Mathematica offers an intuitive easy-to-handle environment of great power and utility. "The Mathematica GuideBook for Symbolics" (code and text fully tailored for Mathematica 5.1) deals with Mathematica's symbolic mathematical capabilities. Structural and mathematical operations on single and systems of polynomials are fundamental to many symbolic calculations and they are covered in considerable detail. The solution of equations and differential equations, as well as the classical calculus operations (differentiation, integration, summation, series expansion, limits) are exhaustively treated. Generalized functions and their uses are discussed. In addition, this volume discusses and employs the classical orthogonal polynomials and special functions of mathematical physics. To demonstrate the symbolic mathematics power, a large variety of problems from mathematics and phyics are discussed Nota de contenido: Introduction and Orientation -- I. Symbolic computations: Remarks -- Manipulation of polynomials -- Manipulations of rational functions of polynomials -- Manipulations of trigonometric expressions -- Systems of linear and nonlinear equations -- Classical analysis -- Differential equations -- Integral transforms and generalized functions -- Three applications -- Overview -- II Classical orthogonal polynomials: Remarks -- General properties of orthogonal polynomials -- Hermite polynomials -- Jacobi polynomials -- Gegenbauer polynomials -- Laguerre polynomials -- Legendre polynomials -- Chebyshev polynomials T -- Chebyshev polynomials U -- Relationships among the orthogonal polynomials -- Overview -- III Classical special functions: Remarks/Introduction -- Gamma, beta, and polygamma functions -- Error functions and Fresnel integrals -- Sine, cosine, exponential, and logarithmic integral functions -- Bessel and airy functions -- Legendre functions -- Hypergeometric functions -- Elliptic integrals -- Elliptic functions -- ProductLog function -- Mathieu functions -- Additional special functions -- Solution of quintics with hypergeometric functions -- Overview -- Index En línea: http://dx.doi.org/10.1007/0-387-28815-5 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=34755 Ejemplares
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Título : Approximate Commutative Algebra Tipo de documento: documento electrónico Autores: SpringerLink (Online service) ; Robbiano, Lorenzo ; John Abbott Editorial: Vienna : Springer Vienna Fecha de publicación: 2010 Colección: Texts and Monographs in Symbolic Computation, A Series of the Research Institute for Symbolic Computation, Johannes Kepler University, Linz, Austria, ISSN 0943-853X Número de páginas: XIV, 227 p. 15 illus., 4 illus. in color Il.: online resource ISBN/ISSN/DL: 978-3-211-99314-9 Idioma : Inglés (eng) Palabras clave: Mathematics Computer science Algebraic geometry Commutative algebra rings Numerical analysis Geometry Rings and Algebras Analysis Symbolic Manipulation Clasificación: 51 Matemáticas Resumen: Approximate Commutative Algebra is an emerging field of research which endeavours to bridge the gap between traditional exact Computational Commutative Algebra and approximate numerical computation. The last 50 years have seen enormous progress in the realm of exact Computational Commutative Algebra, and given the importance of polynomials in scientific modelling, it is very natural to want to extend these ideas to handle approximate, empirical data deriving from physical measurements of phenomena in the real world. In this volume nine contributions from established researchers describe various approaches to tackling a variety of problems arising in Approximate Commutative Algebra Nota de contenido: From Oil Fields to Hilbert Schemes -- Numerical Decomposition of the Rank-Deficiency Set of a Matrix of Multivariate Polynomials -- Towards Geometric Completion of Differential Systems by Points -- Geometric Involutive Bases and Applications to Approximate Commutative Algebra -- Regularization and Matrix Computation in Numerical Polynomial Algebra -- Ideal Interpolation: Translations to and from Algebraic Geometry -- An Introduction to Regression and Errors in Variables from an Algebraic Viewpoint -- ApCoA = Embedding Commutative Algebra into Analysis -- Exact Certification in Global Polynomial Optimization Via Rationalizing Sums-Of-Squares En línea: http://dx.doi.org/10.1007/978-3-211-99314-9 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33692 Approximate Commutative Algebra [documento electrónico] / SpringerLink (Online service) ; Robbiano, Lorenzo ; John Abbott . - Vienna : Springer Vienna, 2010 . - XIV, 227 p. 15 illus., 4 illus. in color : online resource. - (Texts and Monographs in Symbolic Computation, A Series of the Research Institute for Symbolic Computation, Johannes Kepler University, Linz, Austria, ISSN 0943-853X) .
ISBN : 978-3-211-99314-9
Idioma : Inglés (eng)
Palabras clave: Mathematics Computer science Algebraic geometry Commutative algebra rings Numerical analysis Geometry Rings and Algebras Analysis Symbolic Manipulation Clasificación: 51 Matemáticas Resumen: Approximate Commutative Algebra is an emerging field of research which endeavours to bridge the gap between traditional exact Computational Commutative Algebra and approximate numerical computation. The last 50 years have seen enormous progress in the realm of exact Computational Commutative Algebra, and given the importance of polynomials in scientific modelling, it is very natural to want to extend these ideas to handle approximate, empirical data deriving from physical measurements of phenomena in the real world. In this volume nine contributions from established researchers describe various approaches to tackling a variety of problems arising in Approximate Commutative Algebra Nota de contenido: From Oil Fields to Hilbert Schemes -- Numerical Decomposition of the Rank-Deficiency Set of a Matrix of Multivariate Polynomials -- Towards Geometric Completion of Differential Systems by Points -- Geometric Involutive Bases and Applications to Approximate Commutative Algebra -- Regularization and Matrix Computation in Numerical Polynomial Algebra -- Ideal Interpolation: Translations to and from Algebraic Geometry -- An Introduction to Regression and Errors in Variables from an Algebraic Viewpoint -- ApCoA = Embedding Commutative Algebra into Analysis -- Exact Certification in Global Polynomial Optimization Via Rationalizing Sums-Of-Squares En línea: http://dx.doi.org/10.1007/978-3-211-99314-9 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=33692 Ejemplares
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Título : Computer Algebra Recipes : An Advanced Guide to Scientific Modeling Tipo de documento: documento electrónico Autores: Richard H. Enns ; SpringerLink (Online service) ; McGuire, George C Editorial: New York, NY : Springer New York Fecha de publicación: 2007 Número de páginas: X, 374 p. 110 illus Il.: online resource ISBN/ISSN/DL: 978-0-387-49333-6 Idioma : Inglés (eng) Palabras clave: Mathematics Computer science Algebra software Mathematical models Physics Applied mathematics Engineering Modeling and Industrial Symbolic Algebraic Manipulation Appl.Mathematics/Computational Methods of in Software Clasificación: 51 Matemáticas Resumen: Modern computer algebra systems are revolutionizing the teaching and learning of mathematically intensive subjects in science and engineering, enabling students to explore increasingly complex and computationally intensive models that provide analytic solutions, animated numerical solutions, and complex two- and three-dimensional graphic displays. This self-contained text benefits from a spiral structure that regularly revisits the general topics of graphics, symbolic computation, and numerical simulation with increasing intricacy at each turn. The text is built around a large number of computer algebra worksheets or "recipes" that have been designed using MAPLE to provide tools for problem solving and to stimulate critical thinking. No prior knowledge of MAPLE is assumed. All relevant commands are introduced on a need-to-know basis and are indexed for easy reference. Each recipe is associated with a scientific model or method and an interesting or amusing story designed to both entertain and enhance concept comprehension and retention. All recipes are included on the CD-ROM enclosed with the book. Aimed at third- and fourth-year undergraduates in science and engineering, the text contains numerous examples in disciplines that will challenge students progressing in mathematics, physics, engineering, game theory, and physical chemistry. Computer Algebra Recipes: An Advanced Guide to Mathematical Modeling can serve as an effective computational science text, with a set of problems following each section of recipes to enable readers to apply and confirm their understanding. The book may also be used as a reference, for self-study, or as the basis of an online course Nota de contenido: The Appetizers -- Phase-Plane Portraits -- Phase-Plane Analysis -- The Entrees -- Linear ODE Models -- Nonlinear ODE Models -- Linear PDE Models. Part 1 -- Linear PDE Models. Part 2 -- The Desserts -- The Hunt for Solitons -- Nonlinear Diagnostic Tools En línea: http://dx.doi.org/10.1007/978-0-387-49333-6 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=34491 Computer Algebra Recipes : An Advanced Guide to Scientific Modeling [documento electrónico] / Richard H. Enns ; SpringerLink (Online service) ; McGuire, George C . - New York, NY : Springer New York, 2007 . - X, 374 p. 110 illus : online resource.
ISBN : 978-0-387-49333-6
Idioma : Inglés (eng)
Palabras clave: Mathematics Computer science Algebra software Mathematical models Physics Applied mathematics Engineering Modeling and Industrial Symbolic Algebraic Manipulation Appl.Mathematics/Computational Methods of in Software Clasificación: 51 Matemáticas Resumen: Modern computer algebra systems are revolutionizing the teaching and learning of mathematically intensive subjects in science and engineering, enabling students to explore increasingly complex and computationally intensive models that provide analytic solutions, animated numerical solutions, and complex two- and three-dimensional graphic displays. This self-contained text benefits from a spiral structure that regularly revisits the general topics of graphics, symbolic computation, and numerical simulation with increasing intricacy at each turn. The text is built around a large number of computer algebra worksheets or "recipes" that have been designed using MAPLE to provide tools for problem solving and to stimulate critical thinking. No prior knowledge of MAPLE is assumed. All relevant commands are introduced on a need-to-know basis and are indexed for easy reference. Each recipe is associated with a scientific model or method and an interesting or amusing story designed to both entertain and enhance concept comprehension and retention. All recipes are included on the CD-ROM enclosed with the book. Aimed at third- and fourth-year undergraduates in science and engineering, the text contains numerous examples in disciplines that will challenge students progressing in mathematics, physics, engineering, game theory, and physical chemistry. Computer Algebra Recipes: An Advanced Guide to Mathematical Modeling can serve as an effective computational science text, with a set of problems following each section of recipes to enable readers to apply and confirm their understanding. The book may also be used as a reference, for self-study, or as the basis of an online course Nota de contenido: The Appetizers -- Phase-Plane Portraits -- Phase-Plane Analysis -- The Entrees -- Linear ODE Models -- Nonlinear ODE Models -- Linear PDE Models. Part 1 -- Linear PDE Models. Part 2 -- The Desserts -- The Hunt for Solitons -- Nonlinear Diagnostic Tools En línea: http://dx.doi.org/10.1007/978-0-387-49333-6 Link: https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=34491 Ejemplares
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