Add to ORKGAbstract. One of the most used approaches in simulating materials is the tight-binding approximation. When using this method in a material simulation, it is necessary to compute the eigenvalues and eigenvectors of the Hamiltonian describing the system. In general, the system possesses few explicit symmetries. Due to them, the problem has many degenerate eigenvalues. The ambiguity in choosing a orthonormal basis of the invariant subspaces, associated with degenerate eigenvalues, will result in eigenvectors which are not invariant under the action of the symmetry operators in matrix form. A meaningful computation of the eigenvectors needs to take those symmetries into account. A natural choice is a set of eigenvectors, which simultaneously di...
A popular method of extracting phonon frequencies from ab initio calculations is to find the equilib...
The memory cost of representing vibrational wavefunctions of polyatomic molecules with more than 6 a...
The starting point for a quantum mechanical investigation of disordered systems usually implies calc...
In theoretical physics, theoretical chemistry and engineering, one often wishes to solve partial dif...
A numerical application of linear-molecule symmetry properties, described by the D ∞ h ...
The method of transfer matrix which was recently developed by Kerner to treat the problem of electro...
The paper shows that symmetry forms a basis for relations between different properties of material. ...
Symmetry is a fundamental characteristic of any physical system and it plays a clear role in biology...
[[abstract]]The eigenvalue embedding problem addressed in this paper is the one of reassigning a few...
If the Hamiltonian in the time independent Schrödinger equation, HΨ = EΨ, is invariant under a group...
: Linear operators in equations describing physical problems on a symmetric domain often are also eq...
Initial release. Here I present code to construct the single particle eigentstates in an sinusoidal...
The problem of calculating the eleotronic energy levels in solids has attracted great interest, beca...
In this paper we revisit the problem of finding hidden symmetries in quantum mechanical systems. Our...
Schnalle R, Schnack J. Numerically exact and approximate determination of energy eigenvalues for ant...
A popular method of extracting phonon frequencies from ab initio calculations is to find the equilib...
The memory cost of representing vibrational wavefunctions of polyatomic molecules with more than 6 a...
The starting point for a quantum mechanical investigation of disordered systems usually implies calc...
In theoretical physics, theoretical chemistry and engineering, one often wishes to solve partial dif...
A numerical application of linear-molecule symmetry properties, described by the D ∞ h ...
The method of transfer matrix which was recently developed by Kerner to treat the problem of electro...
The paper shows that symmetry forms a basis for relations between different properties of material. ...
Symmetry is a fundamental characteristic of any physical system and it plays a clear role in biology...
[[abstract]]The eigenvalue embedding problem addressed in this paper is the one of reassigning a few...
If the Hamiltonian in the time independent Schrödinger equation, HΨ = EΨ, is invariant under a group...
: Linear operators in equations describing physical problems on a symmetric domain often are also eq...
Initial release. Here I present code to construct the single particle eigentstates in an sinusoidal...
The problem of calculating the eleotronic energy levels in solids has attracted great interest, beca...
In this paper we revisit the problem of finding hidden symmetries in quantum mechanical systems. Our...
Schnalle R, Schnack J. Numerically exact and approximate determination of energy eigenvalues for ant...
A popular method of extracting phonon frequencies from ab initio calculations is to find the equilib...
The memory cost of representing vibrational wavefunctions of polyatomic molecules with more than 6 a...
The starting point for a quantum mechanical investigation of disordered systems usually implies calc...