7 edition of **Solving ordinary differential equations** found in the catalog.

- 65 Want to read
- 30 Currently reading

Published
**1987**
by Springer-Verlag in Berlin, New York
.

Written in English

- Differential equations -- Numerical solutions.

**Edition Notes**

Includes bibliographical references and indexes.

Statement | E. Hairer, S.P. Nørsett, G. Wanner. |

Series | Springer series in computational mathematics ;, 8, 14, 8, etc. |

Contributions | Nørsett, S. P. 1944-, Wanner, Gerhard. |

Classifications | |
---|---|

LC Classifications | QA372 .H16 1987 |

The Physical Object | |

Pagination | 2 v. : |

ID Numbers | |

Open Library | OL2736978M |

ISBN 10 | 0387171452, 0387537759 |

LC Control Number | 86031456 |

Jun 29, · The book “Differential Equations with Application and Historical Notes” is one book I am currently using to learn the topic, and I would highly recommend it. I like how the book connects well with applications in physics, geology, chemistry etc. i. Partial differential equations also play a This book provides an introduction to the basic properties of partial dif-ferential equations (PDEs) and to the techniques that have proved useful in When solving an ordinary differential equation (ODE), one sometimes.

Nov 21, · Approximate Analytical Methods for Solving Ordinary Differential Equations (ODEs) is the first book to present all of the available approximate methods for solving ODEs, eliminating the need to wade through multiple books and articles. It covers both well-established techniques and recently developed procedures, including the classical series solutCited by: 6. $\begingroup$ Try Ordinary Differential Equations by Barreira and Valls; need to probably be $2^{nd}$ to $3^{rd}$ year in a mathematics program though. Teaches the theory; solving equations is not something taught in of itself? Largely acquired as tools - usually .

Artificial neural networks for solving ordinary and partial differential equations Abstract: We present a method to solve initial and boundary value problems using artificial neural networks. A trial solution of the differential equation is written as a sum of two ritacrossley.com by: The book begins with linear algebra, including a number of physical applications, and goes on to discuss first-order differential equations, linear systems of differential equations, higher order differential equations, Laplace transforms, nonlinear systems of differential equations, and numerical methods used in solving differential equations.

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Vols. I and II (SSCM 14) of Solving Ordinary Differential Equations together are the standard text on numerical methods for ODEs. This book is well written and is together with Vol. II, the most comprehensive modern text on numerical integration methods for ODEs. It may serve a a text book for graduate courses, Cited by: Solving Ordinary Differential Equations II: Stiff and Differential-Algebraic Problems (Springer Series in Computational Mathematics) (v.

2) 2nd Edition by Ernst Hairer (Author),Cited by: The book starts with the origin of ordinary differential equations and then moves on to the solution of various orders of ODEs.

The author also has lessons on how to solve specific problems using ODE's to hammer home concepts and their usefulness including problems from Cited by: Vols. I and II (SSCM 14) of Solving Ordinary Differential Equations together are the standard text on numerical methods for ODEs. This book is well written and is together with Vol.

II, the most comprehensive modern text on numerical integration methods for ODEs. It may serve a a text book for graduate courses.

Apr 16, · This book deals with methods for solving nonstiff ordinary differential equations. The first chapter describes the historical development of the classical theory, and the second chapter includes a modern treatment of Runge-Kutta and extrapolation methods.

Chapter three begins with the classical theory of multistep methods, and concludes with the theory of general linear methods. “This volume, on nonstiff equations, is the second of a two-volume set.

This second volume treats stiff differential equations and differential-algebraic equations. This book is highly recommended as a text for courses in numerical methods for ordinary differential equations and. Ordinary differential equations an elementary text book with an introduction to Lie's theory of the group of one parameter.

This elementary text-book on Ordinary Differential Equations, is an attempt to present as much of the subject as is necessary for the beginner in Differential Equations, or, perhaps, for the student of Technology who will not make a specialty of pure Mathematics. Best Sellers in Differential Equations.

Algebra 1 Workbook: The Self-Teaching Guide and Practice Workbook with Exercises and Related Explained Solution. Jan 12, · Definitely the best intro book on ODEs that I've read is Ordinary Differential Equations by Tenebaum and Pollard.

Dover books has a reprint of the book for maybe dollars on Amazon, and considering it has answers to most of the problems found in the book, it's perfect for self study.

An ordinary differential equation (ode) is a differential equation for a function of a single variable, e.g., x(t), while a partial dif- ferential equation (pde) is a differential equation for a function of several variables, e.g., v(x,y,z,t). An ode contains ordinary derivatives and a pde contains partial derivatives.

In the differential equation system, pS(t) must be replaced by p(t)S(t), and in this case we get a differential equation system with a term that is discontinuous. This is usually quite a challenge in mathematics, but as long as we solve the equations numerically in a program, a discontinuous coefficient is easy to ritacrossley.com: Svein Linge, Svein Linge, Hans Petter Langtangen, Hans Petter Langtangen.

Apr 05, · Here is a set of notes used by Paul Dawkins to teach his Differential Equations course at Lamar University. Included are most of the standard topics in 1st and 2nd order differential equations, Laplace transforms, systems of differential eqauations, series solutions as well as a brief introduction to boundary value problems, Fourier series and partial differntial equations.

Ordinary Differential Equations: An Introduction to the Fundamentals (Textbooks in Mathematics). About the Book. This book consists of ten weeks of material given as a course on ordinary differential equations (ODEs) for second year mathematics majors at the University of Bristol.

It is the first course devoted solely to differential equations that these students will take. This book consists of 10 chapters, and the course is 12 weeks long/5(1).

This book deals with methods for solving nonstiff ordinary differential equations. The first chapter describes the historical development of the classical theory, and the second chapter includes a modern treatment of Runge-Kutta and extrapolation methods/5(5).

This elementary text-book on Ordinary Differential Equations, is an attempt to present as much of the subject as is necessary for the beginner in Differential Equations, or, perhaps, for the student of Technology who will not make a specialty of pure Mathematics.

Similarly, Chapter 5 deals with techniques for solving second order equations, and Chapter6 deals withapplications. However, the exercise sets of the sections dealing withtechniques include some appliedproblems.

Traditionallyoriented elementary differential equations texts are. Together with its companion volume [1], this book constitutes the most comprehensive and definitive treatise on the numerical solution of ordinary differential equation initial value problems currently available.

The main competitor is Butcher [2], for which a second volume is projected. Solving Ordinary Differential Equations I Nonstiff Problems Mandelbrot, ) 'This gives us a good occasion to work out most of the book until the next year.

" (the Authors in a letter, dated c. 29,to Springer Verlag) There are two volumes, one on non-stiff equations, now finished, the second on stiff equations, in preparation.

Diﬀerential Equations The complexity of solving de’s increases with the order. We begin with ﬁrst order de’s. Separable Equations A ﬁrst order ode has the form F(x,y,y0) = 0.

In theory, at least, the methods FIRST ORDER ORDINARY DIFFERENTIAL EQUATIONS. and since y(x) = 1 2 + 1 2(2x+1) a relatively natural way to involve the derivative and the function will be: () dy dx (x) = −(2y(x)−1)2.

For a general rational function it is not going to be easy to ﬁnd a corresponding diﬀerential equation that will be of the same type as before.Preface The purpose of this book is to supply a collection of problems for ordinary di erential equations.

Prescribed books for problems. 1) Continous Symmetries, Lie Algebras, Di erential Equations and Com.Numerical methods for ordinary differential equations fall naturally into two classes: those which use one starting value at each step (“one-step methods”) and those which are based on several.