New computational schemes, symbolic-numerical algorithms and programs implementing the high-accuracy finite element method (FEM) for the solution of quantum mechanical boundary-value problems (BVPs) are reviewed. The elliptic BVPs in 2D and 3D domains are solved using the multivariable FEM and Kantorovich method using parametric basis functions. We demonstrate and compare the efficiency of the proposed calculation schemes, algorithms, and software by solving the benchmark BVPs that describe the scattering on a barrier and a well, the bound states of a helium atom, and the quadrupole vibration in a collective nuclear model. © 2018, Allerton Press, Inc
The solution of physical problems discretized using the finite element methods using quantum compute...
Summary: In this paper, details of an implementation of a numerical code for computing the Kohn–Sh...
We present quantum numerical methods for the typical initial boundary value problems (IBVPs) of conv...
New computational schemes, symbolic-numerical algorithms and programs implementing the high-accuracy...
We consider the calculation schemes in the framework of Kantorovich method that consist in the reduc...
We develop a procedure for calculating an optimized Discrete Variable Representation (DVR) optimized...
Structural mechanics is commonly modeled by (systems of) partial differential equations (PDEs). Exce...
We discuss recent developments in finite-element (FE) based methods for the solution of the Kohn-Sha...
A new scheme combining the finite element method and the basis set expansion method in the framework...
We present a new algorithm of the finite element method (FEM) implemented as KANTBP 5M code in MAPLE...
Quantum mechanics undergraduate courses mostly focus on systems with known analytical solutions; the...
We propose new symbolic-numerical algorithms implemented in Maple-Fortran environment for solving th...
The mathematical model of quantum tunnelling of diatomic homonuclear molecules through repulsive bar...
Over the course of the past two decades, quantum mechanical calculations have emerged as a key compo...
AbstractThis paper summarizes a research program that has been underway for a decade. The objective ...
The solution of physical problems discretized using the finite element methods using quantum compute...
Summary: In this paper, details of an implementation of a numerical code for computing the Kohn–Sh...
We present quantum numerical methods for the typical initial boundary value problems (IBVPs) of conv...
New computational schemes, symbolic-numerical algorithms and programs implementing the high-accuracy...
We consider the calculation schemes in the framework of Kantorovich method that consist in the reduc...
We develop a procedure for calculating an optimized Discrete Variable Representation (DVR) optimized...
Structural mechanics is commonly modeled by (systems of) partial differential equations (PDEs). Exce...
We discuss recent developments in finite-element (FE) based methods for the solution of the Kohn-Sha...
A new scheme combining the finite element method and the basis set expansion method in the framework...
We present a new algorithm of the finite element method (FEM) implemented as KANTBP 5M code in MAPLE...
Quantum mechanics undergraduate courses mostly focus on systems with known analytical solutions; the...
We propose new symbolic-numerical algorithms implemented in Maple-Fortran environment for solving th...
The mathematical model of quantum tunnelling of diatomic homonuclear molecules through repulsive bar...
Over the course of the past two decades, quantum mechanical calculations have emerged as a key compo...
AbstractThis paper summarizes a research program that has been underway for a decade. The objective ...
The solution of physical problems discretized using the finite element methods using quantum compute...
Summary: In this paper, details of an implementation of a numerical code for computing the Kohn–Sh...
We present quantum numerical methods for the typical initial boundary value problems (IBVPs) of conv...