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Introduction to Analysis in Several Variables
(Advanced Calculus)
Michael Taylor
Math. Dept., UNC
E-mail address: met@math.unc.edu
2010 Mathematics Subject Classification. 26B05, 26B10, 26B12, 26B15, 26B20
Key words and phrases. real numbers, complex numbers, Euclidean space, metric
spaces, compact spaces, Cauchy sequences, continuous function, power series,
derivative, mean value theorem, Riemann integral, fundamental theorem of
calculus, arclength, exponential function, logarithm, trigonometric functions,
Euler’s formula, multiple integrals, surfaces, surface area, differential forms,
Stokes theorem, degree, Riemannian manifold, metric tensor, geodesics, curvature,
Gauss-Bonnet theorem, Fourier analysis
Contents
Preface xi
Some basic notation xv
Chapter 1. Background 1
1.1. One variable calculus 2
Exercises 13
1.2. Euclidean spaces 17
Exercises 22
1.3. Vector spaces and linear transformations 22
Exercises 30
1.4. Determinants 31
Exercises 36
Chapter 2. Multivariable differential calculus 41
2.1. The derivative 41
Exercises 54
2.2. Inverse function and implicit function theorem 58
Exercises 67
2.3. Systems of differential equations and vector fields 70
Exercises 82
Chapter 3. Multivariable integral calculus and calculus on surfaces 89
3.1. The Riemann integral in n variables 90
Exercises 115
3.2. Surfaces and surface integrals 119
Exercises 138
vii
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