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Mathematical Studies in Nonlinear Wave Propagation
 
Edited by: Dominic P. Clemence North Carolina A & T University, Greensboro, NC
Guoqing Tang North Carolina A & T University, Greensboro, NC
Mathematical Studies in Nonlinear Wave Propagation
eBook ISBN:  978-0-8218-7969-6
Product Code:  CONM/379.E
List Price: $125.00
MAA Member Price: $112.50
AMS Member Price: $100.00
Mathematical Studies in Nonlinear Wave Propagation
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Mathematical Studies in Nonlinear Wave Propagation
Edited by: Dominic P. Clemence North Carolina A & T University, Greensboro, NC
Guoqing Tang North Carolina A & T University, Greensboro, NC
eBook ISBN:  978-0-8218-7969-6
Product Code:  CONM/379.E
List Price: $125.00
MAA Member Price: $112.50
AMS Member Price: $100.00
  • Book Details
     
     
    Contemporary Mathematics
    Volume: 3792005; 213 pp
    MSC: Primary 00; 35; 65

    Lively discussions and stimulating research were part of a five-day conference on Mathematical Methods in Nonlinear Wave Propagation sponsored by the NSF and CBMS. This volume is a collection of lectures and papers stemming from that event. Leading experts present dynamical systems and chaos, scattering and spectral theory, nonlinear wave equations, optimal control, optical waveguide design, and numerical simulation.

    The book is suitable for a diverse audience of mathematical specialists interested in fiber optic communications and other nonlinear phenomena. It is also suitable for engineers and other scientists interested in the mathematics of nonlinear wave propagation.

    Readership

    Graduate students and research mathematicians interested in nonlinear waves and applications to nonlinear optics.

  • Table of Contents
     
     
    • Articles
    • Ronald E. Mickens — An introduction to wave equations [ MR 2149043 ]
    • Martin Klaus — On the Zakharov-Shabat eigenvalue problem [ MR 2149044 ]
    • Tuncay Aktosun — Solitons and inverse scattering transform [ MR 2149045 ]
    • Jianke Yang — A tail-matching method for the linear stability of multi-vector-soliton bound states [ MR 2149046 ]
    • R. H. Goodman, R. E. Slusher, M. I. Weinstein and M. Klaus — Trapping light with grating defects [ MR 2149047 ]
    • Bolindra N. Borah — Thermo-elastic-plastic transition [ MR 2149048 ]
    • Alexandra B. Smirnova — Regularized quasi-Newton method with continuous inversion of $F’+\epsilon I$ for monotone ill-posed operator equations [ MR 2149049 ]
    • Wenzhang Huang — Transition layers for a singularly perturbed neutral delay differential equation [ MR 2149050 ]
    • Ching Y. Loh — Nonlinear aeroacoustics computations by the CE/SE method [ MR 2149051 ]
    • 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 [ MR 2149052 ]
    • G. Tang, D. Clemence, C. Jackson, Q. Lin and V. Burbach — Physical and numerical modeling of seismic wave propagation [ MR 2149053 ]
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
Volume: 3792005; 213 pp
MSC: Primary 00; 35; 65

Lively discussions and stimulating research were part of a five-day conference on Mathematical Methods in Nonlinear Wave Propagation sponsored by the NSF and CBMS. This volume is a collection of lectures and papers stemming from that event. Leading experts present dynamical systems and chaos, scattering and spectral theory, nonlinear wave equations, optimal control, optical waveguide design, and numerical simulation.

The book is suitable for a diverse audience of mathematical specialists interested in fiber optic communications and other nonlinear phenomena. It is also suitable for engineers and other scientists interested in the mathematics of nonlinear wave propagation.

Readership

Graduate students and research mathematicians interested in nonlinear waves and applications to nonlinear optics.

  • Articles
  • Ronald E. Mickens — An introduction to wave equations [ MR 2149043 ]
  • Martin Klaus — On the Zakharov-Shabat eigenvalue problem [ MR 2149044 ]
  • Tuncay Aktosun — Solitons and inverse scattering transform [ MR 2149045 ]
  • Jianke Yang — A tail-matching method for the linear stability of multi-vector-soliton bound states [ MR 2149046 ]
  • R. H. Goodman, R. E. Slusher, M. I. Weinstein and M. Klaus — Trapping light with grating defects [ MR 2149047 ]
  • Bolindra N. Borah — Thermo-elastic-plastic transition [ MR 2149048 ]
  • Alexandra B. Smirnova — Regularized quasi-Newton method with continuous inversion of $F’+\epsilon I$ for monotone ill-posed operator equations [ MR 2149049 ]
  • Wenzhang Huang — Transition layers for a singularly perturbed neutral delay differential equation [ MR 2149050 ]
  • Ching Y. Loh — Nonlinear aeroacoustics computations by the CE/SE method [ MR 2149051 ]
  • 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 [ MR 2149052 ]
  • G. Tang, D. Clemence, C. Jackson, Q. Lin and V. Burbach — Physical and numerical modeling of seismic wave propagation [ MR 2149053 ]
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
Please select which format for which you are requesting permissions.