| Nonlinear Optical Waves 1999 Edition Contributor(s): Maimistov, A. I. (Author), Basharov, A. M. (Author) |
|
 |
ISBN: 0792357523 ISBN-13: 9780792357520 Publisher: Springer OUR PRICE: $208.99 Product Type: Hardcover - Other Formats Published: June 1999 Annotation: This book has been designed as a tutorial for the theory of non-linear waves in optics. The emphasis is on the basic aspects of the theory, on analytical methods and on non-dissipative phenomena. The self-induced transparency phenomenon and short pulse propagation in fibres are good examples of the important role solitons play in non-linear optics. The classical problem of non-linear optics is the parametric interaction of waves. Three- and four-wave parametric interaction processes are of particular interest because they enable new applications of the inverse scattering transform method to non- linear systems without any dispersion. Surface and guided waves are considered as specific examples of non-linear integrated optics. Audience: This volume will be of interest to those involved in electromagnetic theory, optics and optoelectronics, lasers and electro-optics, and the mathematics of physics. |
| Additional Information |
| BISAC Categories: - Science | Physics - Optics & Light - Science | Physics - Mathematical & Computational - Mathematics | Applied |
| Dewey: 535.2 |
| LCCN: 99027060 |
| Series: Fundamental Theories of Physics |
| Physical Information: 1.44" H x 6.14" W x 9.21" (2.46 lbs) 656 pages |
| Descriptions, Reviews, Etc. |
| Publisher Description: A non-linear wave is one of the fundamental objects of nature. They are inherent to aerodynamics and hydrodynamics, solid state physics and plasma physics, optics and field theory, chemistry reaction kinetics and population dynamics, nuclear physics and gravity. All non-linear waves can be divided into two parts: dispersive waves and dissipative ones. The history of investigation of these waves has been lasting about two centuries. In 1834 J. S. Russell discovered the extraordinary type of waves without the dispersive broadening. In 1965 N. J. Zabusky and M. D. Kruskal found that the Korteweg-de Vries equation has solutions of the solitary wave form. This solitary wave demonstrates the particle-like properties, i. e., stability under propagation and the elastic interaction under collision of the solitary waves. These waves were named solitons. In succeeding years there has been a great deal of progress in understanding of soliton nature. Now solitons have become the primary components in many important problems of nonlinear wave dynamics. It should be noted that non-linear optics is the field, where all soliton features are exhibited to a great extent. This book had been designed as the tutorial to the theory of non-linear waves in optics. The first version was projected as the book covering all the problems in this field, both analytical and numerical methods, and results as well. However, it became evident in the process of work that this was not a real task. |