This textbook proposes an informal access to the most important issues of multidimensional differential and integral calculus. The traditional stylecharacterized by listing definitions, theorems, and proofsis replaced by a conversational approach, primarily oriented to applications. The topics covered, developing along the usual path of a textbook for undergraduate courses, are always introduced by thoroughly carried out examples. This drives the reader in building the capacity of properly use the theoretical tools to model and solve practical problems. To situate the contents within a historical perspective, the book is accompanied by a number of links to the biographies of all scientists mentioned as leading actors in the development of the theory.
Chapter 1. Basic concepts and parametrisation of curves.- Chapter
2. Differential and geometric properties of curves.- Chapter 3. Curves in
space: the Frenet frame.- Chapter 4. Functions of a vector variable.- Chapter
5. Continuity and differentiability of functions of a vector
variable.- Chapter 6. Partial derivatives.- Chapter 7. Sequences of
functions.- Chapter 8. Series of functions.- Chapter 9. Taylor series for
functions of several variables.- Chapter 10. Applications of the Taylor
series.- Chapter 11. Integration of functions of two variables.- Chapter
12. Samples of two-dimensional integration and change of variables.- Chapter
13. Two-dimensional integration and area of a surface.- Chapter 14. Vector
functions of vector variables.- Chapter 15. Line integral and flux of vector
functions.- Chapter 16. Triple integrals and coordinate changes.- Chapter
17. Greens formulae for the integral calculus.-Chapter 18. Application of
Greens formulae.- Chapter 19. Gauss and Stokes theorems.- Chapter
20. Partial differential equations.- Etc...
Giorgio Riccardi is Associate Professor at the University of Campania Luigi Vanvitelli, Italy. His research activities concern applications of Complex Analysis to two-dimensional vortex dynamics, numerical and theoretical study of bubble dynamics, two-dimensional fluid-structure interaction handled by means of suitable conformal mappings and numerical simulation of relativistic flows.
Bruno Antonio Cifra is a teacher of Mathematics and Physics at the Ettore Majorana High School in Latina, Italy, and Professor of Geometry and Mathematical Analysis at Sapienza University of Rome. His scientific interests focused initially on operator algebras in the context of relativistic quantum field theory. Subsequently, exploiting his expertise as a musician, he worked on the mathematical coding of musical systems and supersystems, and he is currently involved in musical representations of mathematical models.
Enrico De Bernardis is Senior Research Scientist at the Institute of Marine Engineering National Research Council of Italy. Starting with a main expertise in aerodynamic noise, his research interests have moved to the investigation of underwater noise from ship propulsion systems. In this field he is currently working on fundamental issues in bubble dynamics and cavitation.
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