In this paper we exploit the algebraic structure of the soliton equations and find solutions in terms of neutral free fermion particles. We show how pfaffians arise naturally in the fermionic approach to soliton equations. We write the ?-function for neutral free fermions in terms of pfaffians. Examples of how to get soliton, rational and dromion solutions from ?-functions for the various soliton equations are given. © 2011 Elsevier Inc
We find an analytic solution of the backreacted coupled fermion-baby-Skyrmion system valid at all va...
We employ a time- dependent mean- field- hydrodynamic model to study the generation of bright solito...
In this paper we consider an ultra-cold mixture of boson and fermion atoms on the basis of...
AbstractIn this paper we exploit the algebraic structure of the soliton equations and find solutions...
In this paper we exploit the algebraic structure of the soliton equations and find solutions in term...
AbstractIn this paper we exploit the algebraic structure of the soliton equations and find solutions...
This thesis is concerned with solutions to nonlinear evolution equations. In particular we examine ...
We consider different methods of calculating the (fractional) fermion number of solitons based on th...
The solutions to many soliton systems have been found or reexpressed in terms of Wronskian or Grammi...
In the Thomas-Fermi approximation to theories of coupled fermions and scalars, the equations for sph...
Solitons emerge in various non-linear systems as stable localized configurations, behaving in many w...
The objective of this paper is to use the Pfaffian technique to construct different classes of exact...
Solitons exist in field theories with discrete vacua in flat two-dimensional Minkowski space. In our...
Skyrmions are topological solitons in three space dimensions which are candidates for an effective d...
We examine models of Dirac fermions coupled to topological solitons on the circle S1 and the sphere ...
We find an analytic solution of the backreacted coupled fermion-baby-Skyrmion system valid at all va...
We employ a time- dependent mean- field- hydrodynamic model to study the generation of bright solito...
In this paper we consider an ultra-cold mixture of boson and fermion atoms on the basis of...
AbstractIn this paper we exploit the algebraic structure of the soliton equations and find solutions...
In this paper we exploit the algebraic structure of the soliton equations and find solutions in term...
AbstractIn this paper we exploit the algebraic structure of the soliton equations and find solutions...
This thesis is concerned with solutions to nonlinear evolution equations. In particular we examine ...
We consider different methods of calculating the (fractional) fermion number of solitons based on th...
The solutions to many soliton systems have been found or reexpressed in terms of Wronskian or Grammi...
In the Thomas-Fermi approximation to theories of coupled fermions and scalars, the equations for sph...
Solitons emerge in various non-linear systems as stable localized configurations, behaving in many w...
The objective of this paper is to use the Pfaffian technique to construct different classes of exact...
Solitons exist in field theories with discrete vacua in flat two-dimensional Minkowski space. In our...
Skyrmions are topological solitons in three space dimensions which are candidates for an effective d...
We examine models of Dirac fermions coupled to topological solitons on the circle S1 and the sphere ...
We find an analytic solution of the backreacted coupled fermion-baby-Skyrmion system valid at all va...
We employ a time- dependent mean- field- hydrodynamic model to study the generation of bright solito...
In this paper we consider an ultra-cold mixture of boson and fermion atoms on the basis of...
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