A new method for the numerical simulation of the so-called solitondynamics arising in a nonlinear Schroedinger equation in the semi-classical regime is proposed. For the time discretization a classical fourth-order splitting method is used. For the spatial discretization, however, a meshfree method is employed in contrast to the usual choice of (pseudo) spectral methods. This approach allows to keep the degrees of freedom almost constant as the semi-classical parameter becomes small. This behavior is confirmed by numerical experiments
Splitting Methoden sind in der numerischen Analysis von grundlegendem Interesse, da sie die Komplexi...
Multisymplectic integrators like Preissman and six-point schemes and a semi-explicit symplectic meth...
We present and analyze different splitting algorithms for numerical solution of the both classical a...
Summary. A new method for the numerical simulation of the so-called soliton dynamics arising in a no...
We consider the time-dependent one-dimensional nonlinear Schro¨dinger equation with pointwise singul...
. We extend the well-known split-step Fourier method for solving the nonlinear Schrodinger equation ...
AbstractIn this paper we discuss the numerical simulation of soliton solutions of Schrödnger's syste...
Solutions to the nonlinear Schrodinger equation with potential V(u) = -λulul2 have been theoreticall...
In this paper, we present numerical methods for the determination of solitons, that consist in spati...
Nonlinear evolution equations play enormous significant roles to work with complicated physical phen...
This project studied two different ways of imposing boundary conditions weakly with the finite diffe...
We provide some numerical computations for the soliton dynamics of the nonlinear Schr\"odinger equat...
AbstractThis paper describes moving variable mesh finite difference schemes to numerically solve the...
Systems of coupled non-linear Schrodinger equations with soliton solutions are integrated using the ...
ABSTRACT. We develop a robust and efficient method for soliton calculations for nonlinear Schrödinge...
Splitting Methoden sind in der numerischen Analysis von grundlegendem Interesse, da sie die Komplexi...
Multisymplectic integrators like Preissman and six-point schemes and a semi-explicit symplectic meth...
We present and analyze different splitting algorithms for numerical solution of the both classical a...
Summary. A new method for the numerical simulation of the so-called soliton dynamics arising in a no...
We consider the time-dependent one-dimensional nonlinear Schro¨dinger equation with pointwise singul...
. We extend the well-known split-step Fourier method for solving the nonlinear Schrodinger equation ...
AbstractIn this paper we discuss the numerical simulation of soliton solutions of Schrödnger's syste...
Solutions to the nonlinear Schrodinger equation with potential V(u) = -λulul2 have been theoreticall...
In this paper, we present numerical methods for the determination of solitons, that consist in spati...
Nonlinear evolution equations play enormous significant roles to work with complicated physical phen...
This project studied two different ways of imposing boundary conditions weakly with the finite diffe...
We provide some numerical computations for the soliton dynamics of the nonlinear Schr\"odinger equat...
AbstractThis paper describes moving variable mesh finite difference schemes to numerically solve the...
Systems of coupled non-linear Schrodinger equations with soliton solutions are integrated using the ...
ABSTRACT. We develop a robust and efficient method for soliton calculations for nonlinear Schrödinge...
Splitting Methoden sind in der numerischen Analysis von grundlegendem Interesse, da sie die Komplexi...
Multisymplectic integrators like Preissman and six-point schemes and a semi-explicit symplectic meth...
We present and analyze different splitting algorithms for numerical solution of the both classical a...