Add to ORKGNumerical solution of electronic structures can be obtained using finite element method. Starting with a variational principle, the author derives the matrix form of discretized Schrodinger equation. Two examples demonstrate the correctness of the derived formula. Possible difficulties in solving real problems are shortly discussed
The finite element method is one of the most powerful and widely applicable techniques for the numer...
A new scheme combining the finite element method and the basis set expansion method in the framework...
This work focuses on numerical solutions to quantum systems. I describe the background in quantum m...
The numerical modeling of nanoscale electron devices needs the development of accurate and efficient...
SOLVING THE SCHRODINGER EQUATION USING FUNDAMENTAL NUMERICAL PROCEDURES. A combination of the variat...
In the present paper, the authors transfers the nine-dimensional Schrodinger equation of the ground ...
We use the Galerkin approach and the finite-element method to numerically solve the effective-mass S...
A characteristic feature of the state-of-the-art of real-space methods in electronic structure calcu...
In this thesis we deal with computation of the conductance in an electron transport through a semico...
We present a scheme for a rapid solution of a general three-dimensional Schrödinger equation. The Ha...
A numerical approach for the solution of Maxwell's equations is presented. Based on a finite differe...
In this paper, the Schrodinger equation for a quantum wire is solved using a finite difference appr...
We put forward a new method for the solution of eigenvalue problems for (systems of) ordinary differ...
The time-independent Schrödinger equation is solved using the finite element method (FEM) and the fi...
A numerical method and corresponding computer algorithm for solving the one-dimensional radial Schrö...
The finite element method is one of the most powerful and widely applicable techniques for the numer...
A new scheme combining the finite element method and the basis set expansion method in the framework...
This work focuses on numerical solutions to quantum systems. I describe the background in quantum m...
The numerical modeling of nanoscale electron devices needs the development of accurate and efficient...
SOLVING THE SCHRODINGER EQUATION USING FUNDAMENTAL NUMERICAL PROCEDURES. A combination of the variat...
In the present paper, the authors transfers the nine-dimensional Schrodinger equation of the ground ...
We use the Galerkin approach and the finite-element method to numerically solve the effective-mass S...
A characteristic feature of the state-of-the-art of real-space methods in electronic structure calcu...
In this thesis we deal with computation of the conductance in an electron transport through a semico...
We present a scheme for a rapid solution of a general three-dimensional Schrödinger equation. The Ha...
A numerical approach for the solution of Maxwell's equations is presented. Based on a finite differe...
In this paper, the Schrodinger equation for a quantum wire is solved using a finite difference appr...
We put forward a new method for the solution of eigenvalue problems for (systems of) ordinary differ...
The time-independent Schrödinger equation is solved using the finite element method (FEM) and the fi...
A numerical method and corresponding computer algorithm for solving the one-dimensional radial Schrö...
The finite element method is one of the most powerful and widely applicable techniques for the numer...
A new scheme combining the finite element method and the basis set expansion method in the framework...
This work focuses on numerical solutions to quantum systems. I describe the background in quantum m...