Pages that link to "Item:Q624978"
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The following pages link to Symplectic and multi-symplectic wavelet collocation methods for two-dimensional Schrödinger equations (Q624978):
Displaying 21 items.
- Time-splitting pseudo-spectral domain decomposition method for the soliton solutions of the one- and multi-dimensional nonlinear Schrödinger equations (Q339300) (← links)
- Multi-symplectic wavelet collocation method for the nonlinear Schrödinger equation and the Camassa-Holm equation (Q538541) (← links)
- The multi-symplectic Fourier pseudospectral method for solving two-dimensional Hamiltonian PDEs (Q654745) (← links)
- Computing a numerical solution of two dimensional non-linear Schrödinger equation on complexly shaped domains by RBF based differential quadrature method (Q727596) (← links)
- Multiple-soliton solutions and a generalized double Wronskian determinant to the \((2+1)\)-dimensional nonlinear Schrödinger equations (Q1631113) (← links)
- A numerical scheme based on radial basis function finite difference (RBF-FD) technique for solving the high-dimensional nonlinear Schrödinger equations using an explicit time discretization: Runge-Kutta method (Q1738885) (← links)
- Wavelet approach to quasi two-dimensional extended many-particle systems. I: Supercell Hartree-Fock method (Q1780649) (← links)
- A space-time fully decoupled wavelet Galerkin method for solving multidimensional nonlinear Schrödinger equations with damping (Q1992941) (← links)
- Highly efficient invariant-conserving explicit Runge-Kutta schemes for nonlinear Hamiltonian differential equations (Q2124555) (← links)
- Multi-symplectic quasi-interpolation method for the KdV equation (Q2125902) (← links)
- Meshless symplectic and multi-symplectic local RBF collocation methods for nonlinear Schrödinger equation (Q2134702) (← links)
- Multi-symplectic quasi-interpolation method for Hamiltonian partial differential equations (Q2222333) (← links)
- Symplectic wavelet collocation method for Hamiltonian wave equations (Q2269850) (← links)
- An energy-momentum conserving scheme for Hamiltonian wave equation based on multiquadric trigonometric quasi-interpolation (Q2295255) (← links)
- A meshless scheme for Hamiltonian partial differential equations with conservation properties (Q2360689) (← links)
- A meshless symplectic method for two-dimensional nonlinear Schrödinger equations based on radial basis function approximation (Q2420284) (← links)
- An exploration of multiresolution symplectic scheme for wave propagation using second-generation wavelets (Q2425600) (← links)
- Multi-Symplectic Wavelet Collocation Method for Maxwell’s Equations (Q4919295) (← links)
- The BDF orthogonal spline collocation method for the two-dimensional evolution equation with memory (Q5028618) (← links)
- Novel High-Order Mass- and Energy-Conservative Runge-Kutta Integrators for the Regularized Logarithmic Schrödinger Equation (Q6151343) (← links)
- Mass and energy conservative high-order diagonally implicit Runge-Kutta schemes for nonlinear Schrödinger equation (Q6549110) (← links)
