Geometric measure theory : an introduction

Geometric measure theory : an introduction
Author :
Publisher :
Total Pages : 237
Release :
ISBN-10 : 1571462082
ISBN-13 : 9781571462084
Rating : 4/5 (084 Downloads)

Book Synopsis Geometric measure theory : an introduction by : Fanghua Lin

Download or read book Geometric measure theory : an introduction written by Fanghua Lin and published by . This book was released on 2010 with total page 237 pages. Available in PDF, EPUB and Kindle. Book excerpt:


Geometric measure theory : an introduction Related Books

Geometric measure theory : an introduction
Language: en
Pages: 237
Authors: Fanghua Lin
Categories: Geometric measure theory
Type: BOOK - Published: 2010 - Publisher:

DOWNLOAD EBOOK

Geometric Measure Theory
Language: en
Pages: 154
Authors: Frank Morgan
Categories: Mathematics
Type: BOOK - Published: 2014-05-10 - Publisher: Elsevier

DOWNLOAD EBOOK

Geometric Measure Theory: A Beginner's Guide provides information pertinent to the development of geometric measure theory. This book presents a few fundamental
Geometric Measure Theory
Language: en
Pages: 694
Authors: Herbert Federer
Categories: Mathematics
Type: BOOK - Published: 2014-11-25 - Publisher: Springer

DOWNLOAD EBOOK

"This book is a major treatise in mathematics and is essential in the working library of the modern analyst." (Bulletin of the London Mathematical Society)
Sets of Finite Perimeter and Geometric Variational Problems
Language: en
Pages: 475
Authors: Francesco Maggi
Categories: Mathematics
Type: BOOK - Published: 2012-08-09 - Publisher: Cambridge University Press

DOWNLOAD EBOOK

An engaging graduate-level introduction that bridges analysis and geometry. Suitable for self-study and a useful reference for researchers.
Geometric Integration Theory
Language: en
Pages: 344
Authors: Steven G. Krantz
Categories: Mathematics
Type: BOOK - Published: 2008-12-15 - Publisher: Springer Science & Business Media

DOWNLOAD EBOOK

This textbook introduces geometric measure theory through the notion of currents. Currents, continuous linear functionals on spaces of differential forms, are a