Analysis
Elliott H. Lieb, Michael Loss
Price
1600
ISBN
9781470409326
Language
English
Pages
376
Format
Paperback
Dimensions
180 x 240 mm
Year of Publishing
2013
Territorial Rights
Restricted
Imprint
Universities Press

Significantly revised and expanded, this new Second Edition provides readers at all levels--from beginning students to practicing analysts--with the basic concepts and standard tools necessary to solve problems of analysis, and how to apply these concepts to research in a variety of areas.

Authors Elliott Lieb and Michael Loss take you quickly from basic topics to methods that work successfully in mathematics and its applications. While omitting many usual typical textbook topics, Analysis includes all necessary definitions, proofs, explanations, examples, and exercises to bring the reader to an advanced level of understanding with a minimum of fuss, and, at the same time, doing so in a rigorous and pedagogical way. Many topics that are useful and important, but usually left to advanced monographs, are presented in Analysis, and these give the beginner a sense that the subject is alive and growing.

This edition incorporates numerous changes since the publication of the original 1997 edition and includes:

  • a new chapter on eigenvalues that covers the min-max principle, semi-classical approximation, coherent states, Lieb-Thirring inequalities, and more
  • extensive additions to chapters covering Sobolev Inequalities, including the Nash and Log Sobolev inequalities
  • new material on Measure and Integration
  • many new exercises
  • and much more ...

This edition is an authoritative, straightforward volume that readers--from the graduate student, to the professional mathematician, to the physicist or engineer using analytical methods--will find useful both as a reference and as a guide to real problem solving.

Elliott H. Lieb, Princeton University, NJ, and Michael Loss, Georgia Institute of Technology, Atlanta, GA

  • Measure and integration
  • L p-spaces
  • Rearrangement inequalities
  • Integral inequalities
  • The Fourier transform
  • Distributions
  • The Sobolev spaces  H 1 and  H 1/2
  • Sobolev inequalities
  • Potential theory and Coulomb energies
  • Regularity of solutions of Poisson's equation
  • Introduction to the calculus of variations
  • More about eigenvalues
  • Part Title
  • List of symbols
  • References
  • Index