This item is printed on demand - it takes 3-4 days longer - Neuware -An important question in geometry and analysis is to know when two k-forms f and g are equivalent through a change of variables. The problem is therefore to find a map phi so that it satisfies the pullback equation: phi\*(g) = f. In more physical terms, the question under consideration can be seen as a problem of mass transportation. The problem has received considerable attention in the cases k = 2 and k = n, but much less when 3 k n-1. The present monograph provides the first comprehensive study of the equation. The work begins by recounting various properties of exterior forms and differential forms that prove useful throughout the book. From there it goes on to present the classical Hodge-Morrey decomposition and to give several versions of the Poincar� lemma. The core of the book discusses the case k = n, and then the case 1 k n-1 with special attention on the case k = 2, which is fundamental in symplectic geometry. Special emphasis is given to optimal regularity, global results and boundary data. The last part of the work discusses H�lder spaces in detail; all the results presented here are essentially classical, but cannot be found in a single book. This section may serve as a reference on H�lder spaces and therefore will be useful to mathematicians well beyond those who are only interested in the pullback equation. The Pullback Equation for Differential Forms is a self-contained and concise monograph intended for both geometers and analysts. The book may serveas a valuable reference for researchers or a supplemental text for graduate courses or seminars. 448 pp. Englisch.

Seller Inventory # 9780817683122

Contact seller

Report this item

Bibliographic Details

Title: The Pullback Equation for Differential Forms
Publisher: Birkh�user Boston Nov 2011
Publication Date: 2011
Language: English
ISBN 10: 0817683127
ISBN 13: 9780817683122
Binding: Buch
Condition: Neu
Dimensions: 241 millimeters width by 160 millimeters height by 28 millimeters depth
Weight: 834 grams

About this title

Synopsis

An important question in geometry and analysis is to know when two k-forms f and g are equivalent through a change of variables. The problem is therefore to find a map φ so that it satisfies the pullback equation: φ*(g) = f.

In more physical terms, the question under consideration can be seen as a problem of mass transportation. The problem has received considerable attention in the cases k = 2 and k = n, but much less when 3 ≤ k ≤ n–1. The present monograph provides the first comprehensive study of the equation.

The work begins by recounting various properties of exterior forms and differential forms that prove useful throughout the book. From there it goes on to present the classical Hodge–Morrey decomposition and to give several versions of the Poincar� lemma. The core of the book discusses the case k = n, and then the case 1≤ k ≤ n–1 with special attention on the case k = 2, which is fundamental in symplectic geometry. Special emphasis is given to optimal regularity, global results and boundary data. The last part of the work discusses H�lder spaces in detail; all the results presented here are essentially classical, but cannot be found in a single book. This section may serve as a reference on H�lder spaces and therefore will be useful to mathematicians well beyond those who are only interested in the pullback equation.

The Pullback Equation for Differential Forms is a self-contained and concise monograph intended for both geometers and analysts. The book may serveas a valuable reference for researchers or a supplemental text for graduate courses or seminars.

About the Author

Csato, Dacorogna, and Kneuss teach at Ecole Polytechnique Fédérale de Lausanne in Switzerland.

"About this title" may belong to another edition of this title.

Store Description

Visit Seller's Storefront

Seller's business information

BuchWeltWeit Ludwig Meier e.K.
Germany

Sale & Shipping Terms

Terms of Sale

Allgemeine Gesch�ftsbedingungen mit Kundeninformationen
Inhaltsverzeichnis
Geltungsbereich
Vertragsschluss
Widerrufsrecht
Preise und Zahlungsbedingungen
Liefer- und Versandbedingungen
Eigentumsvorbehalt
M�ngelhaftung
Anwendbares Recht
Gerichtsstand
Alternative Streitbeilegung

Geltungsbereich
1.1 Diese Allgemeinen Gesch�ftsbedingungen (nachfolgend "AGB") des BuchWeltWeit Inh. Ludwig Meier e.K. (nachfolgend "Verk�ufer"), gelten f�r alle Vertr�ge, die ein Verbraucher oder Unternehmer (nachfolgend ?...

More Information

Shipping Terms

Der Versand ins Ausland findet IMMER mit DHL statt. Auch nach �sterreich verschicken wir nur mit DHL! Daher Standardversand == Luftpost!

Shipping rates from Germany to U.S.A.

Shipping rates from Germany to U.S.A.
Order quantity	5 to 15 business days	5 to 15 business days
First item	US$ 26.92	US$ 26.92

Delivery times are set by sellers and vary by carrier and location. Orders passing through Customs may face delays and buyers are responsible for any associated duties or fees. Sellers may contact you regarding additional charges to cover any increased costs to ship your items.