TY  - BOOK
AU  - Todorov,Michail D.
ED  - Morgan & Claypool Publishers,
ED  - Institute of Physics, IOP - EBA (Great Britain),
TI  - Nonlinear waves: theory, computer simulation, experiment 
T2  - [IOP release 5]
SN  - 9781643270470
AV  - QA927 .T646 2018eb
U1  - 530.155355 23
PY  - 2018///]
CY  - San Rafael [California] (40 Oak Drive, San Rafael, CA, 94903, USA)
PB  - Morgan & Claypool Publishers
KW  - Nonlinear wave equations
KW  - Mathematical physics
KW  - Dynamics & statistics
KW  - bicssc
KW  - SCIENCE / Mechanics / Dynamics
KW  - bisacsh
N1  - "Version: 20180801"--Title page verso; "A Morgan & Claypool publication as part of IOP Concise Physics"--Title page verso; Includes bibliographical references; 1. Two-dimensional Boussinesq equation. Boussinesq paradigm and soliton solutions -- 1.1. Boussinesq equations. Generalized wave equation -- 1.2. Investigation of the long-time evolution of localized solutions of a dispersive wave system -- 1.3; 2. Systems of coupled nonlinear Schr�odinger equations. Vector Schr�odinger equation -- 2.1. Conservative scheme in complex arithmetic for vector nonlinear Schr�odinger equations -- 2.2. Finite-difference implementation of conserved; 3. Ultrashort optical pulses. Envelope dispersive equations -- 3.1. On a method for solving of multidimensional equations of mathematical physics -- 3.2. Dynamics of high-intensity ultrashort light pulses at some basic propagation regimes -- 3.3; Also available in print
N2  - The Boussinesq equation is the first model of surface waves in shallow water that considers the nonlinearity and the dispersion and their interaction as a reason for wave stability known as the Boussinesq paradigm. This balance bears solitary wa
UR  - https://ezproxy.mef.edu.tr/login?url=https://iopscience.iop.org/book/978-1-64327-047-0
ER  -