Add to ORKGThe goal of the present paper is to introduce a multidimensional generalization of asymptotic reduction given in a paper by Alber and Marsden [1992], to use this to obtain a new class of solutions that we call resonant solitons, and to study the corresponding geometric phases. The term "resonant solitons" is used because those solutions correspond to a spectrum with multiple points, and they also represent a dividing solution between two different types of solitons. In this sense, these new solutions are degenerate and, as such, will be considered as singular points in the moduli space of solitons
In chapter 2, we study two Kaup-Newell-type matrix spectral problems, derive their soliton hierarchi...
Quantum coupling is defined by comparing the evolution of an input to an output phase, where the pha...
In this paper the interaction of sine-Gordon solitons and mediating linear waves is modelled by a sp...
This paper develops a new complex Hamiltonian structure forn-soliton solutions for a class of integ...
The purpose of this Letter is to investigate the geometry of new classes of soliton-like solutions f...
This book offers a detailed treatment of a class of algebro-geometric solutions and their representa...
Solitons are explicit solutions to nonlinear partial differential equations exhibiting particle-like...
In this paper geometric phases (Berry and Aharonov-Bohm) are generalized to nonlinear topological ph...
A general asymptotic approach to the stability problem of multi-parameter solitons in Hamiltonian sy...
In the first part of this thesis algebro-geometric solutions for the sine-Gordon and KdV equations i...
In the present paper, we construct a particular class of solu- tions of the sine-Gordon equation, wh...
Bäcklund transformations between all known completely integrable third-order differential equations ...
The relationships between phase shifts, monodromy effects and billiard solutions are studied in the...
In this paper it is shown how higher-dimensional solitons can be stabilized by a topological phase g...
We study the stepwise sine-Gordon equation, in which the system parameter is different for positive ...
In chapter 2, we study two Kaup-Newell-type matrix spectral problems, derive their soliton hierarchi...
Quantum coupling is defined by comparing the evolution of an input to an output phase, where the pha...
In this paper the interaction of sine-Gordon solitons and mediating linear waves is modelled by a sp...
This paper develops a new complex Hamiltonian structure forn-soliton solutions for a class of integ...
The purpose of this Letter is to investigate the geometry of new classes of soliton-like solutions f...
This book offers a detailed treatment of a class of algebro-geometric solutions and their representa...
Solitons are explicit solutions to nonlinear partial differential equations exhibiting particle-like...
In this paper geometric phases (Berry and Aharonov-Bohm) are generalized to nonlinear topological ph...
A general asymptotic approach to the stability problem of multi-parameter solitons in Hamiltonian sy...
In the first part of this thesis algebro-geometric solutions for the sine-Gordon and KdV equations i...
In the present paper, we construct a particular class of solu- tions of the sine-Gordon equation, wh...
Bäcklund transformations between all known completely integrable third-order differential equations ...
The relationships between phase shifts, monodromy effects and billiard solutions are studied in the...
In this paper it is shown how higher-dimensional solitons can be stabilized by a topological phase g...
We study the stepwise sine-Gordon equation, in which the system parameter is different for positive ...
In chapter 2, we study two Kaup-Newell-type matrix spectral problems, derive their soliton hierarchi...
Quantum coupling is defined by comparing the evolution of an input to an output phase, where the pha...
In this paper the interaction of sine-Gordon solitons and mediating linear waves is modelled by a sp...