The objective of this textbook is the construction, analysis, and interpretation of mathematical models to help us understand the world we live in. Rather than follow a case study approach it develops the mathematical and physical ideas that are fundamental in understanding contemporary problems in science and engineering. Science evolves, and this means that the problems of current interest continually change.
What does not change as quickly is the approach used to derive the relevant mathematical models, and the methods used to analyze the models. Consequently, this book is written in such a way as to establish the mathematical ideas underlying model development independently of a specific application. This does not mean applications are not considered, they are, and connections with experiment are a staple of this book.
The book, as well as the individual chapters, is written in such a way that the material becomes more sophisticated as you progress. This provides some flexibility in how the book is used, allowing consideration for the breadth and depth of the material covered.
Moreover, there are a wide spectrum of exercises and detailed illustrations that significantly enrich the material. Students and researchers interested in mathematical modelling in mathematics, physics, engineering and the applied sciences will find this text useful.
The material, and topics, have been updated to include recent developments in mathematical modeling. The exercises have also been expanded to include these changes, as well as enhance those from the first edition.
Author(s): Mark Hayden Holmes
Series: Texts in Applied Mathematics 56
Edition: 2
Publisher: Springer
Year: 2019
Language: English
Pages: 535
Front Matter ....Pages i-xvi
Dimensional Analysis (Mark H. Holmes)....Pages 1-47
Perturbation Methods (Mark H. Holmes)....Pages 49-101
Kinetics (Mark H. Holmes)....Pages 103-164
Diffusion (Mark H. Holmes)....Pages 165-232
Traffic Flow (Mark H. Holmes)....Pages 233-294
Continuum Mechanics: One Spatial Dimension (Mark H. Holmes)....Pages 295-343
Elastic and Viscoelastic Materials (Mark H. Holmes)....Pages 345-387
Continuum Mechanics: Three Spatial Dimensions (Mark H. Holmes)....Pages 389-443
Newtonian Fluids (Mark H. Holmes)....Pages 445-495
Back Matter ....Pages 497-528