Beschreibung
InhaltsangabePreface. 0.1 Short Introduction. 0.2 Introduction. Acknowledgments. 1 Calculus I. 1.1 A Sketch of the Development of Rigor in Calculus and Analysis. 1.2 Basics. 1.3 Limits and Continuous Functions. 1.4 Differentiation. 1.5 Applications of Differentiation. 1.6 Riemann Integration. 2 Calculus II. 2.1 Techniques of Integration. 2.2 Improper Integrals. 2.3 Series of Real Numbers. 2.4 Series of Functions. 2.5 Analytical Geometry and Elementary Vector Calculus. 3 Calculus III. 3.1 VectorValued Functions of Several Variables. 3.2 Derivatives of Vector-Valued Functions of Several Variables. 3.3 Applications of Differentiation. 3.4 Integration of Functions of Several Variables. 3.5 Vector Calculus. 3.6 Generalizations of the Fundamental Theorem of Calculus. Appendix A. A.1 Construction of the Real-Number System. A.2 The Lebesgue Criterion for Riemann Integrability. A.3 Properties of the Determinant. A.4 The Inverse Mapping Theorem. References. Index of Notation. Index of Terminology. Problem Solutions.
Autorenportrait
Horst R. Beyer, PHD, is Professor of Mathematics at the Institute for Physics and Mathematics at the University of Michoacán (Mexico). Dr. Beyer has written numerous published articles in his areas of research interest, which include functional analysis, operator theory, partial differential equations, and semigroup theory.
Inhalt
Preface. 0.1 Short Introduction. 0.2 Introduction. Acknowledgments. 1 Calculus I. 1.1 A Sketch of the Development of Rigor in Calculus and Analysis. 1.2 Basics. 1.3 Limits and Continuous Functions. 1.4 Differentiation. 1.5 Applications of Differentiation. 1.6 Riemann Integration. 2 Calculus II. 2.1 Techniques of Integration. 2.2 Improper Integrals. 2.3 Series of Real Numbers. 2.4 Series of Functions. 2.5 Analytical Geometry and Elementary Vector Calculus. 3 Calculus III. 3.1 Vector-Valued Functions of Several Variables. 3.2 Derivatives of Vector-Valued Functions of Several Variables. 3.3 Applications of Differentiation. 3.4 Integration of Functions of Several Variables. 3.5 Vector Calculus. 3.6 Generalizations of the Fundamental Theorem of Calculus. Appendix A. A.1 Construction of the Real-Number System. A.2 The Lebesgue Criterion for Riemann Integrability. A.3 Properties of the Determinant. A.4 The Inverse Mapping Theorem. References. Index of Notation. Index of Terminology. Problem Solutions.
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