Real Analysis Lecture Notes

Real Analysis Lecture Notes by Itay Neeman

This note covers the following topics: Construction of the Real Line, Uniqueness of R and Basic General Topology, Completeness and Sequential Compactness, Convergence of Sums, Path-Connectedness, Lipschitz Functions and Contractions, and Fixed Point Theorems, Uniformity, Normed Spaces and Sequences of Functions, Arzela-Ascoli, Differentiation and Associated Rules, Applications of Differentiation, The Riemann Integral, Limits of Integrals, Mean Value Theorem for Integrals, and Integral Inequalities, Inverse Function Theorem, Implicit Function Theorem and Lagrange Multipliers, Multivariable Integration and Vector Calculus

Author(s): Itay Neeman

99 Pages

Real Analysis Notes by Manonmaniam Sundaranar University

This note explains the following topics: Basic topology, Series, Continuity and Differentiation, The Riemann–Steiltjes integral and Sequences and series of function, Uniform Convergence and differentiation.

Author(s): Manonmaniam Sundaranar University

139 Pages

Introduction to Real Analysis by Theodore Kilgore

This note explains the following topics: Integers and Rational Numbers, Building the real numbers, Series, Topological concepts, Functions, limits, and continuity, Cardinality, Representations of the real numbers, The Derivative and the Riemann Integral, Vector and Function Spaces, Finite Taylor-Maclaurin expansions, Integrals on Rectangles.

Author(s): Theodore Kilgor

352 Pages

Introduction to Real Analysis by Liviu I. Nicolaescu

This note covers the following topics: mathematical reasoning, The Real Number System, Special classes of real numbers, Limits of sequences, Limits of functions, Continuity, Differential calculus, Applications of differential calculus, Integral calculus, Complex numbers and some of their applications, The geometry and topology of Euclidean spaces, Continuity, Multi-variable differential calculus, Applications of multi-variable differential calculus, Multidimensional Riemann integration, Integration over submanifolds.

Author(s): Liviu I. Nicolaescu

696 Pages

Companion to Real Analysis

This note is an activity-oriented companion to the study of real analysis. It is intended as a pedagogical companion for the beginner, an introduction to some of the main ideas in real analysis, a compendium of problems, are useful in learning the subject, and an annotated reading or reference list. Topics covered includes: Sets, Functions, Cardinality, Groups, Vector Spaces, And Algebras, Partially Ordered Sets, The Real Numbers, Sequences And Indexed Families, Categories, Ordered Vector Spaces, Topological Spaces, Continuity And Weak Topologies, Normed Linear Spaces, Differentiation, Complete Metric Spaces, Algebras And Lattices Of Continuous Functions.

Author(s): John M. Erdman

265 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

Real Analysis Notes by Prof. Sizwe Mabizela

This note explains the following topics: Logic and Methods of Proof, Sets and Functions , Real Numbers and their Properties, Limits and Continuity, Riemann Integration, Introduction to Metric Spaces.

Author(s): Prof. Sizwe Mabizela

120 Pages

Real Analysis by Gabriel Nagy

This note covers the following topics: Topology Preliminaries, Elements of Functional Analysis, Measure Theory, Integration Theory, Product Spaces, Analysis On Locally Compact Spaces, Introduction to Harmonic Analysis.

Author(s): Gabriel Nagy

NA Pages

Real Analysis by Dr. Maria Cristina Pereyra

This text is evolved from authors lecture notes on the subject, and thus is very much oriented towards a pedagogical perspective; much of the key material is contained inside exercises, and in many cases author chosen to give a lengthy and tedious, but instructive, proof instead of a slick abstract proof. Topics covered includes: The natural numbers, Set theory, Integers and rationals, The real numbers, Limits of sequences, Series, Infinite sets, Continuous functions on R, Differentiation of functions, The Riemann integral, the decimal system and basics of mathematical logic.

Author(s): Dr. Maria Cristina Pereyra

171 Pages

Real Analysis Guru Jambheshwar University

This note covers the following topics: Sequences and Series of Functions, Uniform Convergence, Power series, Linear transformations, Functions of several variables, Jacobians and extreme value problems, The Riemann-Stieltjes integrals, Measure Theory.

Author(s): Guru Jambheshwar University of Science and Technology, Hisar

132 Pages

An Introduction to Real Analysis

These lecture notes are an introduction to undergraduate real analysis. They cover the real numbers and one-variable calculus.

Author(s): John K. Hunter

269 Pages

Notes in Introductory Real Analysis

This note covers the following topics related to Real Analysis: Ordered Fields and the Real Number System, Integration, The Extended Real Line and its Topology.

Author(s): Ambar N. Sengupta

123 Pages

A Little Real Analysis and Topology

This note covers the following topics: Intervals, Upper Bounds, Maximal Element, Least Upper Bound (supremum), Triangle Inequality, Cauchy-schwarz Inequality, Sequences and Limits, Functions and Point Set Topology.

Author(s): Arne Hallam

9 Pages

Real Variables with Basic Metric Space Topology

This is a text in elementary real analysis. Topics covered includes: Upper and Lower Limits of Sequences of Real Numbers, Continuous Functions, Differentiation, Riemann-Stieltjes Integration, Unifom Convergence and Applications, Topological Results and Epilogue.

Author(s): Robert B. Ash

217 Pages

Theory of Functions of Real Variable

Currently this section contains no detailed description for the page, will update this page soon.

Author(s): NA

NA Pages

IRA Interactive Real Analysis(Wachsmuth B.G)

Currently this section contains no detailed description for the page, will update this page soon.

Author(s): NA

NA Pages