An investigation of the inverse scattering method under certain nonvanishing conditions /

Au Yeung, Tin-cheung.

January 1987

Thesis (Ph. D.)--University of Hong Kong, 1988.

Solitons. Inverse scattering transform.

Solitons and wave propagation in hydrodynamical and optical media

Mak, Chun-chung., 麥振忠.

January 2004

published_or_final_version / abstract / toc / Mechanical Engineering / Master / Master of Philosophy

Solitons.

Fiber optics.

Hydrodynamics.

Soliton solutions of nonisospectral variable-coefficient evolution equations via Zakharov-Shabat dressing method

霍逸遠, Fok, Yat-yuen, Eric.

January 1996

published_or_final_version / Mathematics / Master / Master of Philosophy

Evolution equations, Nonlinear.

Solitons.

The exact profile of the solitary wave

Schwitters, Jan Dreier, 1939-

January 1966

No description available.

Waves.

Nonlinear waves.

Solitons.

Classical sigma models in 2+1 dimensions

Ioannidou, Theodora

January 1996

The work in this thesis is concerned with the study of dynamics, scattering and stability of solitons in planar models, i.e. where spacetime is (2+l)-dimensionaI. We consider both integrable models, where exact solutions can be written in closed form, and nonintegrable models where approximations and numerical methods must be employed. For theories that possess a topological lower bound on the energy, there is a useful approximation in which the kinetic energy is assumed to remain small. All these approaches are used at various stages of the thesis. Chapters 1 and 2 review the planar models which are the subjects of this thesis. Chapters 3 and 4 are concerned with integrable chiral equations. First we exhibit an infinite sequence of well-defined conserved quantities and then we construct exact soliton and soliton-antisoliton solutions using analytical methods. We find that there exist solitons that scatter in a different way to those previously found in integrable models. Furthermore, this soliton scattering resembles very closely that found in nonintegrable models, thereby providing a link between the two classes. Chapter 5 develops a numerical simulation based on topological arguments, which is used in a study of soliton stability in the (unmodified) 0(3) model. This confirms that the sohtons are unstable, in the sense that their size is subject to large changes. The same results are obtained by using the slow-motion approximation.

530.1

Solitons; Non-trivial scattering

Perturbation theory of charged scalar solitons with electromagnetic interaction

Nadeau, Raymond.

January 1983

No description available.

Solitons.

Perturbation (Quantum dynamics)

Survey of some developments in the Gross-Neveu model

Trudeau-Reeves, Pierre

January 1983

No description available.

Quantum field theory.

Solitons.

A study of forced solitary Rossby waves /

Brasnett, Bruce.

January 1982

No description available.

Rossby waves.

Solitons.

A soliton circuit design system /

Groves, Michael Peter.

January 1987

Thesis (Ph. D.)--University of Adelaide, Dept. of Computer Science, 1987. / Includes bibliographical references (leaves 233-234).

Electronic digital computers Solitons.

Matter-wave solitons in optical lattices and superlattices /

Louis, Pearl J. Y.

January 2005

Thesis (Ph.D.)--Australian National University, 2005.

Solitons. Bose-Einstein condensation.