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Mathematical Studies in Nonlinear Wave Propagation

Dominic P. Clemence, and Guoqing Tang, editors
Publisher: 
American Mathematical Society
Publication Date: 
2005
Number of Pages: 
211
Format: 
Paperback
Series: 
Contemporary Mathematics 379
Price: 
59.00
ISBN: 
0-8218-3349-9
Category: 
Proceedings
We do not plan to review this book.

  • R. E. Mickens -- An introduction to wave equations
  • M. Klaus -- On the Zakharov-Shabat eigenvalue problem
  • T. Aktosun -- Solitons and inverse scattering transform
  • J. Yang -- A tail-matching method for the linear stability of multi-vector-soliton bound states
  • R. H. Goodman, R. E. Slusher, M. I. Weinstein, and M. Klaus -- Trapping light with grating defects
  • B. N. Borah -- Thermo-elastic-plastic transition
  • A. B. Smirnova -- Regularized quasi-Newton method with continuous inversion of $F'+\varepsilon I$ for monotone ill-posed operator equations
  • W. Huang -- Transition layers for a singularly perturbed neutral delay differential equation
  • C. Y. Loh -- Nonlinear aeroacoustics computations by the CE/SE method
  • S. C. Chang, A. Himansu, C. Y. Loh, X. Y. Wang, and S. T. Yu -- Robust and simple non-reflecting boundary conditions for the Euler equations-A new approach based on the space-time CE/SE method
  • G. Tang, D. Clemence, C. Jackson, Q. Lin, and V. Burbach -- Physical and numerical modeling of seismic wave propagation