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Variational Methods: Applications to Nonlinear Partial Differential Equations and Hamiltonian Systems

✍ Scribed by Michael Struwe (auth.)

Book ID
127436288
Publisher
Springer
Year
2000
Tongue
English
Weight
3 MB
Edition
2nd, enl. ed
Category
Library
City
Berlin; New York
ISBN
0387112901

No coin nor oath required. For personal study only.

✦ Synopsis

"Geometric Invariant Theory" by Mumford/Fogarty (the first edition was published in 1965, a second, enlarged editon appeared in 1982) is the standard reference on applications of invariant theory to the construction of moduli spaces. This third, revised edition has been long awaited for by the mathematical community. It is now appearing in a completely updated and enlarged version with an additional chapter on the moment map by Prof. Frances Kirwan (Oxford) and a fully updated bibliography of work in this area. The book deals firstly with actions of algebraic groups on algebraic varieties, separating orbits by invariants and construction quotient spaces; and secondly with applications of this theory to the construction of moduli spaces. It is a systematic exposition of the geometric aspects of the classical theory of polynomial invariants.

✦ Subjects

Analysis

πŸ“œ SIMILAR VOLUMES

Variational Methods: Applications to Non
Variational Methods: Applications to Nonlinear Partial Differential Equations and Hamiltonian Systems
✍ Michael Struwe πŸ“‚ Library πŸ“… 1990 πŸ› Not Avail 🌐 English βš– 3 MB

Hilbert's talk at the second International Congress of 1900 in Paris marked the beginning of a new era in the calculus of variations. A development began which, within a few decades, brought tremendous success, highlighted by the 1929 theorem of Ljusternik and Schnirelman on the existence of three d

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✍ Michael Struwe πŸ“‚ Library πŸ“… 2000 πŸ› Springer 🌐 English βš– 2 MB

b>Aus der Amazon.de-Redaktion Das Buch bietet eine ausgezeichnete, klar dargestellte Übersicht über einige Gebiete der modernen Variationsrechnung. Das erste Kapitel behandelt direkte Methoden der Variationsrechnung, welche die Existenz des Minimums eines Variationsproblems sicherstellen sollen, ver