Roughly speaking, analysis covers more than half of the whole of mathematics.It includes the topics following the limit operation and provides a strong basis for applications of mathematics. Its starting part in the educational process, mathematical analysis, deals with the issues concentrated around continuity.
【目录】
Preface 1 Sets and Proofs 1.1 Sets, Elements, and Subsets 1.2 Operations on Sets 1.3 Language of Logic 1.4 Techniques of Proof 1.5 Relations 1.6 Functions 1.7 Axioms of Set Theory Exercises
2 Numbers 2.1 SystemN 2.2 Systems Z and Q 2.3 Least Upper Bound Property and Q 2.4 System R 2.5 Least Upper Bound Property and R 2.6 Systems R, C, and *R 2.7 Cardinality Exercises
3 Convergence 3.1 Convergence ofNumerical Sequences 3.2 Cauchy Criterion for Convergence 3.3 Ordered Field Structure and Convergence 3.4 Subsequences 3.5 NumericalSeries 3.6 Some Series of Particular Interest 3.7 AbsoluteConvergence 3.8 Number e Exercises
4 Point Set Topology 4.1 MetricSpaces 4.2 Open and Closed Sets 4.3 Completeness 4.4 Separability 4.5 TotaIBoundedness 4.6 Compactness 4.7 Perfectness 4.8 Connectedness 4.9* Structure of Open and Closed Sets Exercises
5 Continuity 5.1 Definition and Examples 5.2 Continuity and Limits 5.3 Continuity and Compactness 5.4 Continuity and Connectedness 5.5 Continuity and Oscillation 5.6 Continuity of Rk-valued Functions Exercises
6 Space C(E, E') 6.1 UniformContinuity 6.2 UniformConvergence 6.3 Completeness of C(E, E) 6.4 Bernstein and Weierstrass Theorems 6.5* Stone and Weierstrass Theorems 6.6* Ascoli-Arzela Theorem Exercises
7 Differentiation 7.1 Derivative 7.2 Differentiation and Continuity 7.3 Rules of Differentiation 7.4 Mean-ValueTheorems 7.5 Taylor'sTheorem 7.6* DifferentialEquations 7.7* Banach Spaces and the Space C1 (a,b) 7.8 A View to Differentiation in Rk Exercises
8 Bounded Variation 8.1 Monotone Functions 8.2 CantorFunction 8.3 Functions ofBoundedVariation 8.4 Space BV(a, b) 8.5 Continuous Functions of Bounded Variation ……
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