This paper develops a new complex Hamiltonian structure forn-soliton solutions for a class of integrable equations such as the nonlinear Schrödinger, sine-Gordon and Korteweg-de Vries hierarchies of equations that yields, amongst other things, geometric phases in the sense of Hannay and Berry. For example, one of the possible soliton geometric phases is manifested by the well known phase shift that occurs for interacting solitons. The main new tools are complex angle representations that linearize the corresponding Hamiltonian flows on associated noncompact Jacobi varieties. This new structure is obtained by taking appropriate limits of the differential equations describing the class of quasi-periodic solutions. A method of asymptotic re...
The geometric phase is defined for any arbitrary quantum evolution using a "reference section" of th...
In the first part of this dissertation we introduce two matrix iso-spectral problems, a Kaup-Newell ...
In this paper a geometric phase is proposed to characterise the topological quantum phase ...
The goal of the present paper is to introduce a multidimensional generalization of asymptotic reduct...
In this work we study geometric asymptotics and geometric phases for the new parametrised families o...
The purpose of this Letter is to investigate the geometry of new classes of soliton-like solutions f...
A wave function picks up, in addition to the dynamic phase, the geometric (Berry) phase when travers...
The usual definition of a geometric phase involves particular conditions on the behaviour of the st...
The geometric phase in quantum mechanics was originally elucidated in the context of the adiabatic t...
The relationships between phase shifts, monodromy effects and billiard solutions are studied in the...
We define a new unitary operator in the Hilbert space of a quantum system which parallel transports ...
Bäcklund transformations between all known completely integrable third-order differential equations ...
In chapter 2, we study two Kaup-Newell-type matrix spectral problems, derive their soliton hierarchi...
The use of Hamiltonian-versus-energy (HVE) curves for localised optical soliton solutions is a power...
We present new developments in nonadiabatic geometric phases along two lines for systems undergoing ...
The geometric phase is defined for any arbitrary quantum evolution using a "reference section" of th...
In the first part of this dissertation we introduce two matrix iso-spectral problems, a Kaup-Newell ...
In this paper a geometric phase is proposed to characterise the topological quantum phase ...
The goal of the present paper is to introduce a multidimensional generalization of asymptotic reduct...
In this work we study geometric asymptotics and geometric phases for the new parametrised families o...
The purpose of this Letter is to investigate the geometry of new classes of soliton-like solutions f...
A wave function picks up, in addition to the dynamic phase, the geometric (Berry) phase when travers...
The usual definition of a geometric phase involves particular conditions on the behaviour of the st...
The geometric phase in quantum mechanics was originally elucidated in the context of the adiabatic t...
The relationships between phase shifts, monodromy effects and billiard solutions are studied in the...
We define a new unitary operator in the Hilbert space of a quantum system which parallel transports ...
Bäcklund transformations between all known completely integrable third-order differential equations ...
In chapter 2, we study two Kaup-Newell-type matrix spectral problems, derive their soliton hierarchi...
The use of Hamiltonian-versus-energy (HVE) curves for localised optical soliton solutions is a power...
We present new developments in nonadiabatic geometric phases along two lines for systems undergoing ...
The geometric phase is defined for any arbitrary quantum evolution using a "reference section" of th...
In the first part of this dissertation we introduce two matrix iso-spectral problems, a Kaup-Newell ...
In this paper a geometric phase is proposed to characterise the topological quantum phase ...