COURSE IN ANALYSIS, A - VOL. II: DIFFERENTIATION AND INTEGRATION OF FUNCTIONS OF SEVERAL VARIABLES, VECTOR CALCULUS

The second part handles iterated and volume integrals for real-valued functions. Here we develop the Riemann (-Darboux-Jordan) theory. A whole chapter is devoted to boundaries and Jordan measurability of domains. We also handle in detail improper integrals and give some of their applications.

The final part of this volume takes up a first discussion of vector calculus. Here we present a working mathematician's version of Green's, Gauss' and Stokes' theorem. Again some emphasis is given to applications, for example to the study of partial differential equations. At the same time we prepare the student to understand why these theorems and related objects such as surface integrals demand a much more advanced theory which we will develop in later volumes.

This volume offers more than 260 problems solved in complete detail which should be of great benefit to every serious student.

Readership: Undergraduate students in mathematics.