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An Introduction to Analysis
Contributor(s): Gunning, Robert C. (Author)
ISBN: 0691178798     ISBN-13: 9780691178790
Publisher: Princeton University Press
OUR PRICE:   $71.25  
Product Type: Hardcover - Other Formats
Published: March 2018
Qty:
Temporarily out of stock - Will ship within 2 to 5 weeks
Additional Information
BISAC Categories:
- Mathematics | Mathematical Analysis
- Mathematics | Calculus
Dewey: 515
LCCN: 2017963672
Physical Information: 1.1" H x 7.3" W x 10.1" (2.05 lbs) 384 pages
 
Descriptions, Reviews, Etc.
Publisher Description:

An essential undergraduate textbook on algebra, topology, and calculus

An Introduction to Analysis is an essential primer on basic results in algebra, topology, and calculus for undergraduate students considering advanced degrees in mathematics. Ideal for use in a one-year course, this unique textbook also introduces students to rigorous proofs and formal mathematical writing--skills they need to excel.

With a range of problems throughout, An Introduction to Analysis treats n-dimensional calculus from the beginning--differentiation, the Riemann integral, series, and differential forms and Stokes's theorem--enabling students who are serious about mathematics to progress quickly to more challenging topics. The book discusses basic material on point set topology, such as normed and metric spaces, topological spaces, compact sets, and the Baire category theorem. It covers linear algebra as well, including vector spaces, linear mappings, Jordan normal form, bilinear mappings, and normal mappings.

Proven in the classroom, An Introduction to Analysis is the first textbook to bring these topics together in one easy-to-use and comprehensive volume.

  • Provides a rigorous introduction to calculus in one and several variables
  • Introduces students to basic topology
  • Covers topics in linear algebra, including matrices, determinants, Jordan normal form, and bilinear and normal mappings
  • Discusses differential forms and Stokes's theorem in n dimensions
  • Also covers the Riemann integral, integrability, improper integrals, and series expansions