A Course in Analysis Volume II Differentiation and integration of Functions of Several Variables Vector Calculus 1st Edition Niels Jacob 9813140984 9789813140981

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Product details:

• ISBN 10: 9813140984
• ISBN 13: 9789813140981
• Author: Niels Jacob

‘The authors give many examples, illustrations and exercises to help students digest the theory and they employ use of clear and neat notation throughout. I really appreciate their selection of exercises, since many of the problems develop simple techniques to be used later in the book or make connections of analysis with other parts of mathematics. There are also solutions to all of the exercises in the back of the book. As in the first volume there are some real gems in volume II. A Course in Analysis seems to be full of these little gems where the authors use the material or ask the readers to use the material to obtain results or examples that the reader will certainly see again in another context later in their studies of mathematics. Generally, the quality of exposition in both of the first two volumes is very high. I recommend these books.’ (See Full Review) MAA ReviewsThis is the second volume of ‘A Course in Analysis’ and it is devoted to the study of mappings between subsets of Euclidean spaces. The metric, hence the topological structure is discussed as well as the continuity of mappings. This is followed by introducing partial derivatives of real-valued functions and the differential of mappings. Many chapters deal with applications, in particular to geometry (parametric curves and surfaces, convexity), but topics such as extreme values and Lagrange multipliers, or curvilinear coordinates are considered too. On the more abstract side results such as the Stone-Weierstrass theorem or the Arzela-Ascoli theorem are proved in detail. The first part ends with a rigorous treatment of line integrals.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.

Table of contents:

1 Metric Spaces
2 Convergence and Continuity in Metric Spaces
3 More on Metric Spaces and Continuous Functions
4 Continuous Mappings Between Subsets of Euclidean Spaces
5 Partial Derivatives
6 The Differential of a Mapping
7 Curves in ℝn
8 Surfaces in ℝ3. A First Encounter
9 Taylor Formula and Local Extreme Values
10 Implicit Functions and the Inverse Mapping Theorem
11 Further Applications of the Derivatives
12 Curvilinear Coordinates
13 Convex Sets and Convex Functions in ℝn
14 Spaces of Continuous Functions as Banach Spaces
15 Line Integrals
16 Towards Volume Integrals in the Sense of Riemann
17 Parameter Dependent and Iterated Integrals
18 Volume Integrals on Hyper-Rectangles
19 Boundaries in ℝn and Jordan Measurable Sets
20 Volume Integrals on Bounded Jordan Measurable Sets
21 The Transformation Theorem: Result and Applications
22 Improper Integrals and Parameter Dependent Integrals
23 The Scope of Vector Calculus
24 The Area of a Surface in ℝ3 and Surface Integrals
25 Gauss’ Theorem in ℝ3
26 Stokes’ Theorem in ℝ2 and R3
27 Gauss’ Theorem for ℝn

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