Wave Motion: Theory, Modelling, and Computation
Proceedings of a Conference in Honor of the 60th Birthday of Peter D. Lax
Published on 17. February 2013
Book
Paperback/Softback
X, 336 pages
978-1-4613-9585-0 (ISBN)
Description
The 60th birthday of Peter Lax was celebrated at Berkeley by a conference entitled
Wave
M
otion: theory, application and
computation
held at the mathematical Sciences Research Institute, June 9-12, 1986. Peter Lax has made profound and essential contributions to the topics described by the title of the conference, and has also contributed in important ways to many other mathematical subjects, and as a result this conference volume dedicated to him includes research work on a variety of topics, not all clearly related to its title.
More details
Series
Edition
Softcover reprint of the original 1st ed. 1987
Language
English
Place of publication
New York
United States
Target group
Professional and scholarly
Research
Illustrations
1 s/w Abbildung
X, 336 p. 1 illus.
Dimensions
Height: 235 mm
Width: 155 mm
Thickness: 20 mm
Weight
534 gr
ISBN-13
978-1-4613-9585-0 (9781461395850)
DOI
10.1007/978-1-4613-9583-6
Schweitzer Classification
Other editions
Additional editions
AlexandreJ. Chorin | Andrew J. Majda
Wave Motion: Theory, Modelling, and Computation
Proceedings of a Conference in Honor of the 60th Birthday of Peter D. Lax
Book
10/1987
Springer
€85.59
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Content
Lattice Vortex Models and Turbulence Theory.- The Curve Shortening Flow.- Lax's Construction of Parametrices of Fundamental Solutions of Strongly Hyperbolic Operators, Its Prehistory and Posthistory.- The Bukiet-Jones Theory of Weak Detonation Waves in Curvilinear Geometry.- Three-Dimensional Fluid Dynamics in a Two-Dimensional Amount of Central Memory.- On the Nonlinearity of Modern Shock-Capturing Schemes.- High Frequency Semilinear Oscillations.- Exact Controllability and Singular Perturbations.- Transonic Flow and Compensated Compactness.- Scattering Theory for the Wave Equation on a Hyperbolic Manifold.- Determinants of Laplacians on Surfaces.- The Small Dispersion Limit of the Korteweg-de Vries Equation.