# Free eBook Extensions of Moser–Bangert Theory: Locally Minimal Solutions (Progress in Nonlinear Differential Equations and Their Applications) download

## by Edward W. Stredulinsky,Paul H. Rabinowitz

**ISBN:**0817681167

**Author:**Edward W. Stredulinsky,Paul H. Rabinowitz

**Publisher:**Birkhäuser; 2011 edition (June 24, 2011)

**Language:**English

**Pages:**208

**Category:**Math Science

**Subcategory:**Mathematics

**Size MP3:**1943 mb

**Size FLAC:**1586 mb

**Rating:**4.3

**Format:**azw rtf lit lrf

Locally Minimal Solutions.

Paul H. Rabinowitz and others published Extensions of Moser-Bangert theory. Locally minimal solutions. Book · January 2011 with 4 Reads. Cite this publication.

Rabinowitz, Paul H;Stredulinsky, Edward W. - Springer. Differential equations, Nonlinear Mathematics sähkökirjat.

Extensions of Moser-Bangert Theory: Locally Minimal Solutions. Paul H. Rabinowitz, Edward W. Stredulinsky.

P. H. Rabinowitz and E. Stredulinsky, Extensions of Moser-Bangert Theory: Locally Minimal Solutions, Progress in Nonlinear Differential Equations and Their Applications Volume 81, Birkhauser.

Alle Bücher der Reihe Progress in Nonlinear Differential Equations and Their .

Extensions of Moser-Bangert Theory book.

Extensions of Moser-Bangert Theory Locally Minimal Solutions

This self-contained monograph presents extensions of the Moser–Bangert approach that include solutions of a family of nonlinear elliptic PDEs on *Rn* and an Allen–Cahn PDE model of phase transitions. After recalling the relevant Moser–Bangert results, *Extensions of Moser–Bangert Theory* pursues the rich structure of the set of solutions of a simpler model case, expanding upon the studies of Moser and Bangert to include solutions that merely have local minimality properties.

The work is intended for mathematicians who specialize in partial differential equations and may also be used as a text for a graduate topics course in PDEs.