Ordinary Differential Equations with Modern Applications
Author: N. Finizio
Publisher: Brooks/Cole
Published: 1989
Total Pages: 460
ISBN-13:
DOWNLOAD EBOOKPosts
Ordinary Differential Equations with Applications
Author: Carmen Chicone
Publisher: Springer Science & Business Media
Published: 2008-04-08
Total Pages: 569
ISBN-13: 0387226230
DOWNLOAD EBOOKBased on a one-year course taught by the author to graduates at the University of Missouri, this book provides a student-friendly account of some of the standard topics encountered in an introductory course of ordinary differential equations. In a second semester, these ideas can be expanded by introducing more advanced concepts and applications. A central theme in the book is the use of Implicit Function Theorem, while the latter sections of the book introduce the basic ideas of perturbation theory as applications of this Theorem. The book also contains material differing from standard treatments, for example, the Fiber Contraction Principle is used to prove the smoothness of functions that are obtained as fixed points of contractions. The ideas introduced in this section can be extended to infinite dimensions.
Modern Elementary Differential Equations
Author: Richard Bellman
Publisher: Courier Corporation
Published: 1995-01-01
Total Pages: 260
ISBN-13: 9780486686431
DOWNLOAD EBOOKDesigned to introduce students to the theory and applications of differential equations and to help them formulate scientific problems in terms of such equations, this undergraduate-level text emphasizes applications to problems in biology, economics, engineering, and physics. This edition also includes material on discontinuous solutions, Riccati and Euler equations, and linear difference equations.
Differential Equations: Techniques, Theory, and Applications
Author: Barbara D. MacCluer
Publisher: American Mathematical Soc.
Published: 2019-10-02
Total Pages: 890
ISBN-13: 1470447975
DOWNLOAD EBOOKDifferential Equations: Techniques, Theory, and Applications is designed for a modern first course in differential equations either one or two semesters in length. The organization of the book interweaves the three components in the subtitle, with each building on and supporting the others. Techniques include not just computational methods for producing solutions to differential equations, but also qualitative methods for extracting conceptual information about differential equations and the systems modeled by them. Theory is developed as a means of organizing, understanding, and codifying general principles. Applications show the usefulness of the subject as a whole and heighten interest in both solution techniques and theory. Formal proofs are included in cases where they enhance core understanding; otherwise, they are replaced by informal justifications containing key ideas of a proof in a more conversational format. Applications are drawn from a wide variety of fields: those in physical science and engineering are prominent, of course, but models from biology, medicine, ecology, economics, and sports are also featured. The 1,400+ exercises are especially compelling. They range from routine calculations to large-scale projects. The more difficult problems, both theoretical and applied, are typically presented in manageable steps. The hundreds of meticulously detailed modeling problems were deliberately designed along pedagogical principles found especially effective in the MAA study Characteristics of Successful Calculus Programs, namely, that asking students to work problems that require them to grapple with concepts (or even proofs) and do modeling activities is key to successful student experiences and retention in STEM programs. The exposition itself is exceptionally readable, rigorous yet conversational. Students will find it inviting and approachable. The text supports many different styles of pedagogy from traditional lecture to a flipped classroom model. The availability of a computer algebra system is not assumed, but there are many opportunities to incorporate the use of one.
Differential Equations and Their Applications
Author: M. Braun
Publisher: Springer Science & Business Media
Published: 2013-06-29
Total Pages: 733
ISBN-13: 1475749694
DOWNLOAD EBOOKFor the past several years the Division of Applied Mathematics at Brown University has been teaching an extremely popular sophomore level differential equations course. The immense success of this course is due primarily to two fac tors. First, and foremost, the material is presented in a manner which is rigorous enough for our mathematics and ap plied mathematics majors, but yet intuitive and practical enough for our engineering, biology, economics, physics and geology majors. Secondly, numerous case histories are given of how researchers have used differential equations to solve real life problems. This book is the outgrowth of this course. It is a rigorous treatment of differential equations and their appli cations, and can be understood by anyone who has had a two semester course in Calculus. It contains all the material usually covered in a one or two semester course in differen tial equations. In addition, it possesses the following unique features which distinguish it from other textbooks on differential equations.
Differential Equations with Applications
Author: Paul D. Ritger
Publisher: Courier Corporation
Published: 2000-01-01
Total Pages: 580
ISBN-13: 9780486411545
DOWNLOAD EBOOKCoherent, balanced introductory text focuses on initial- and boundary-value problems, general properties of linear equations, and the differences between linear and nonlinear systems. Includes large number of illustrative examples worked out in detail and extensive sets of problems. Answers or hints to most problems appear at end.
Ordinary Differential Equations and Applications
Author: W S Weiglhofer
Publisher: Elsevier
Published: 1999-06-01
Total Pages: 228
ISBN-13: 0857099736
DOWNLOAD EBOOKThis introductory text presents ordinary differential equations with a modern approach to mathematical modelling in a one semester module of 20–25 lectures. - Presents ordinary differential equations with a modern approach to mathematical modelling - Discusses linear differential equations of second order, miscellaneous solution techniques, oscillatory motion and laplace transform, among other topics - Includes self-study projects and extended tutorial solutions
Introduction to Partial Differential Equations with Applications
Author: E. C. Zachmanoglou
Publisher: Courier Corporation
Published: 2012-04-20
Total Pages: 434
ISBN-13: 048613217X
DOWNLOAD EBOOKThis text explores the essentials of partial differential equations as applied to engineering and the physical sciences. Discusses ordinary differential equations, integral curves and surfaces of vector fields, the Cauchy-Kovalevsky theory, more. Problems and answers.
Ordinary Differential Equations and Their Solutions
Author: George Moseley Murphy
Publisher: Courier Corporation
Published: 2011-01-01
Total Pages: 466
ISBN-13: 0486485919
DOWNLOAD EBOOKThis treatment presents most of the methods for solving ordinary differential equations and systematic arrangements of more than 2,000 equations and their solutions. The material is organized so that standard equations can be easily found. Plus, the substantial number and variety of equations promises an exact equation or a sufficiently similar one. 1960 edition.
Linear Ordinary Differential Equations
Author: Earl A. Coddington
Publisher: SIAM
Published: 1997-01-01
Total Pages: 353
ISBN-13: 9781611971439
DOWNLOAD EBOOKLinear Ordinary Differential Equations, a text for advanced undergraduate or beginning graduate students, presents a thorough development of the main topics in linear differential equations. A rich collection of applications, examples, and exercises illustrates each topic. The authors reinforce students' understanding of calculus, linear algebra, and analysis while introducing the many applications of differential equations in science and engineering. Three recurrent themes run through the book. The methods of linear algebra are applied directly to the analysis of systems with constant or periodic coefficients and serve as a guide in the study of eigenvalues and eigenfunction expansions. The use of power series, beginning with the matrix exponential function leads to the special functions solving classical equations. Techniques from real analysis illuminate the development of series solutions, existence theorems for initial value problems, the asymptotic behavior solutions, and the convergence of eigenfunction expansions.
