AbstractThis paper describes moving variable mesh finite difference schemes to numerically solve the nonlinear Schrödinger equation including the effects of damping and nonhomogeneity in the propagation media. These schemes have accurately predicted the location of the peak of soliton compared to the uniform mesh, for the case in which the exact solution is known. Numerical results are presented when damping and nonhomogeneous effects are included, and in the absence of these effects the results were verified with the available exact solution
This project studied two different ways of imposing boundary conditions weakly with the finite diffe...
We show the existence of waveforms of finite-energy (vector solitons) for a coupled nonlinear Schröd...
In this work, after reviewing two different ways to solve Riccati systems, we are able to present an...
AbstractThis paper describes moving variable mesh finite difference schemes to numerically solve the...
We consider semidiscrete approximation schemes for the linear Schrödinger equation and analyze wheth...
In this article we report on recent work on building numerical approxi-mation schemes for nonlinear ...
AbstractWe describe a novel numerical approach to simulations of nonlinear Schrödinger equations wit...
Two 1D nonlinear coupled Schrödinger equations are often used for describing optical frequency conve...
Abstract. We consider semidiscrete approximation schemes for the linear Schrödinger equation and an...
Summary. A new method for the numerical simulation of the so-called soliton dynamics arising in a no...
A High-order accurate finite difference scheme is derived for a non-linear soliton model of nerve si...
We investigate the numerical solution of the nonlinear Schrödinger equation in two spatial dimension...
AbstractA nonlinear partial difference equation is obtained, which has as its limiting form the nonl...
We construct soliton solution of a variable coefficients nonlinear Schrödinger equation in the prese...
AbstractNumerical simulations of Nonlinear Schrödinger Equation are studied using differential quadr...
This project studied two different ways of imposing boundary conditions weakly with the finite diffe...
We show the existence of waveforms of finite-energy (vector solitons) for a coupled nonlinear Schröd...
In this work, after reviewing two different ways to solve Riccati systems, we are able to present an...
AbstractThis paper describes moving variable mesh finite difference schemes to numerically solve the...
We consider semidiscrete approximation schemes for the linear Schrödinger equation and analyze wheth...
In this article we report on recent work on building numerical approxi-mation schemes for nonlinear ...
AbstractWe describe a novel numerical approach to simulations of nonlinear Schrödinger equations wit...
Two 1D nonlinear coupled Schrödinger equations are often used for describing optical frequency conve...
Abstract. We consider semidiscrete approximation schemes for the linear Schrödinger equation and an...
Summary. A new method for the numerical simulation of the so-called soliton dynamics arising in a no...
A High-order accurate finite difference scheme is derived for a non-linear soliton model of nerve si...
We investigate the numerical solution of the nonlinear Schrödinger equation in two spatial dimension...
AbstractA nonlinear partial difference equation is obtained, which has as its limiting form the nonl...
We construct soliton solution of a variable coefficients nonlinear Schrödinger equation in the prese...
AbstractNumerical simulations of Nonlinear Schrödinger Equation are studied using differential quadr...
This project studied two different ways of imposing boundary conditions weakly with the finite diffe...
We show the existence of waveforms of finite-energy (vector solitons) for a coupled nonlinear Schröd...
In this work, after reviewing two different ways to solve Riccati systems, we are able to present an...