Noch Fragen? 0800 / 33 82 637

Ordinary Differential Equations

Example-driven, Including Maple Code

Produktform: E-Buch Text Elektronisches Buch in proprietärem

This introductory text combines models from physics and biology with rigorous reasoning in describing the theory of ordinary differential equations along with applications and computer simulations with Maple. Offering a concise course in the theory of ordinary differential equations, it also enables the reader to enter the field of computer simulations. Thus, it is a valuable read for students in mathematics as well as in physics and engineering. It is also addressed to all those interested in mathematical modeling with ordinary differential equations and systems. Contents Part I: Theory Chapter 1 First-Order Differential Equations Chapter 2 Linear Differential Systems Chapter 3 Second-Order Differential Equations Chapter 4 Nonlinear Differential Equations Chapter 5 Stability of Solutions Chapter 6 Differential Systems with Control Parameters Part II: Exercises Seminar 1 Classes of First-Order Differential Equations Seminar 2 Mathematical Modeling with Differential Equations Seminar 3 Linear Differential Systems Seminar 4 Second-Order Differential Equations Seminar 5 Gronwall’s Inequality Seminar 6 Method of Successive Approximations Seminar 7 Stability of Solutions Part III: Maple CodeLab 1 Introduction to Maple Lab 2 Differential Equations with Maple Lab 3 Linear Differential Systems Lab 4 Second-Order Differential Equations Lab 5 Nonlinear Differential Systems Lab 6 Numerical Computation of Solutions Lab 7 Writing Custom Maple Programs Lab 8 Differential Systems with Control Parameters weiterlesen

Dieser Artikel gehört zu den folgenden Serien

Elektronisches Format:

Sprache(n): Englisch

ISBN: 978-3-11-044750-7 / 978-3110447507 / 9783110447507

Verlag: De Gruyter

Erscheinungsdatum: 22.01.2018

Seiten: 234

Auflage: 1

Autor(en): Radu Precup

699,00 € inkl. MwSt.
Multi-user eBook price
kostenloser Versand

sofort lieferbar - Lieferzeit 1-3 Werktage

zurück