Introductory Analysis, Second Edition: The Theory of Calculus

Introductory Analysis, Second Edition, is intended for the standard course on calculus limit theories that is taken after a problem solving first course in calculus (most often by junior/senior mathematics majors). Topics studied include sequences, function limits, derivatives, integrals, series, metric spaces, and calculus in n-dimensional Euclidean space
* Bases most of the various limit concepts on sequential limits, which is done first
* Defines function limits by first developing the notion of continuity (with a sequential limit characterization)
* Contains a thorough development of the Riemann integral, improper integrals (including sections on the gamma function and the Laplace transform), and the Stieltjes integral
* Presents general metric space topology in juxtaposition with Euclidean spaces to ease the transition from the concrete setting to the abstract
New to This Edition
* Contains new Exercises throughout
* Provides a simple definition of subsequence
* Contains more information on function limits and L'Hospital's Rule
* Provides clearer proofs about rational numbers and the integrals of Riemann and Stieltjes
* presents an appendix lists all mathematicians named in the text
* Gives a glossary of symbols