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A Story of Real Analysis How We Got From There To Here
This note covers the following topics: Numbers, Real (R) and Rational (Q), Calculus in the 17th and 18th Centuries, Power Series, Convergence of Sequences and Series, The Taylor Series, Continuity, Intermediate and Extreme Values, From Fourier Series back to the Real Numbers.
Author(s): Robert Rogers and Eugene Boman
144 Pages 
An Introduction to Real Analysis by Cesar O Angular
This note describes the following topics: preliminaries, The real numbers, Sequences, Limits of functions, Continuity, Differentiation, Riemann integration, Sequences of functions, Metric spaces, Multivariable differential calculus.
Author(s): Cesar O Angular
360 Pages
Lecture Notes on Real Analysis by Xiaojing Ye
This note covers preliminaries, Measure and measurable sets, Measurable functions, Lebesgue integral, Signed measures and differentiations, Lp spaces and probability theory.
Author(s): Xiaojing Ye
76 Pages
Lecture Notes on Real Analysis by Nicolas Lerner
This note covers the following topics: Basic structures of topology and metrics, Basic tools of Functional Analysis, Theory of Distributions, Fourier Analysis, Analysis on Hilbert spaces.
Author(s): Nicolas Lerner
170 Pages
Spaces An Introduction to Real Analysis
This note explains the following topics: Preliminaries: Proofs, Sets, and Functions, The Foundation of Calculus, Metric Spaces, Spaces of Continuous Functions, Modes of continuity, Applications to differential equations, Applications to power series.
Author(s): Tom L. Lindstrom
148 Pages