Symplectic methods for the nonlinear Schrödinger equation
- Tang, Y.-F.
- Vázquez, L.
- Zhang, F.
- Pérez-García, V.M.
DOIAbstract
10.1016/0898-1221(96)00136-8Computers and Mathematics with Applications32573-83CMAP
10.1016/0898-1221(96)00136-8Computers and Mathematics with Applications32573-83CMAP
In this paper, we investigate multi-symplectic Runge-Kutta-Nyström (RKN) methods for non-linear Sch...
In this paper we study the use of energy-conserving methods, in the class of Hamiltonian Boundary Va...
We present several methods, which utilize symplectic integration techniques based on two and three p...
AbstractIn this paper, we show that the spatial discretization of the nonlinear Schrödinger equation...
AbstractThe Hamiltonian and the multi-symplectic formulations of the nonlinear Schrödinger equation ...
AbstractThe solution of the one-dimensional time-independent Schrödinger equation is considered by s...
Multi-symplectic methods have recently been cons idered as a generalization of symplectic ODE method...
AbstractIn general, proofs of convergence and stability are difficult for symplectic schemes of nonl...
Multisymplectic integrators like Preissman and six-point schemes and a semi-explicit symplectic meth...
Radially symmetric solutions of many important systems of partial differential equations can be redu...
Radially symmetric solutions of many important systems of partial differential equations can be redu...
Radially symmetric solutions of many important systems of partial differential equations can be redu...
AbstractThe Hamiltonian and the multi-symplectic formulations of the nonlinear Schrödinger equation ...
AbstractIn the manuscript, we discuss the symplectic integrator for the numerical solution of a kind...
In this paper we study the use of energy-conserving methods, in the class of Hamiltonian Boundary Va...
In this paper, we investigate multi-symplectic Runge-Kutta-Nyström (RKN) methods for non-linear Sch...
In this paper we study the use of energy-conserving methods, in the class of Hamiltonian Boundary Va...
We present several methods, which utilize symplectic integration techniques based on two and three p...
AbstractIn this paper, we show that the spatial discretization of the nonlinear Schrödinger equation...
AbstractThe Hamiltonian and the multi-symplectic formulations of the nonlinear Schrödinger equation ...
AbstractThe solution of the one-dimensional time-independent Schrödinger equation is considered by s...
Multi-symplectic methods have recently been cons idered as a generalization of symplectic ODE method...
AbstractIn general, proofs of convergence and stability are difficult for symplectic schemes of nonl...
Multisymplectic integrators like Preissman and six-point schemes and a semi-explicit symplectic meth...
Radially symmetric solutions of many important systems of partial differential equations can be redu...
Radially symmetric solutions of many important systems of partial differential equations can be redu...
Radially symmetric solutions of many important systems of partial differential equations can be redu...
AbstractThe Hamiltonian and the multi-symplectic formulations of the nonlinear Schrödinger equation ...
AbstractIn the manuscript, we discuss the symplectic integrator for the numerical solution of a kind...
In this paper we study the use of energy-conserving methods, in the class of Hamiltonian Boundary Va...
In this paper, we investigate multi-symplectic Runge-Kutta-Nyström (RKN) methods for non-linear Sch...
In this paper we study the use of energy-conserving methods, in the class of Hamiltonian Boundary Va...
We present several methods, which utilize symplectic integration techniques based on two and three p...
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