A discretization size and step size varying strategy in the numerical solution of I-Dimensional Schrodinger Equation
In this thesis we present a numerical solution of the I-dimensional Schrodinger equation using the method of lines approach (MOL) where we discretize the spatial dimension using some finite difference approximation leaving the time dimension to be the only independent variable in the resulting syste...
Saved in:
相似書籍
-
Numerical solution of the time-dependent schrodinger equation /
由: Noorul Akma Mat Amin
出版: (2015) -
Mathematica Packages for Solving Schrodinger Equation with One Dimensional Rectangular Potentials
由: Siddig, Abubaker Ahmed Mohamed
出版: (2003) -
Generalized Heisenberg models and nonlinear Schrodinger equations /
由: Dai, Bo
出版: (2002) -
The implementation of controlled adiabatic and nonadiabatic evolutions quantum gates in open systems /
由: Benmachiche, Abderrahim
出版: (2020) -
Numerical solutions of stiff ordinary differential equations and differential algebraic equations using one-step implicit hybrid methods
由: Khoo, Kai Wen
出版: (2015)