Add to ORKGWe introduce a new concept of infinite quasi-exactly solvable models which are constructable through multi-parameter deformations of known exactly solvable ones. The spectral problem for these models admits exact solutions for infinitely many eigenstates but not for the whole spectrum. The hermiticity of their hamiltonians is guaranteed by construction. The proposed models have quasi-exactly solvable classical conterparts
We review three examples of quasi exactly solvable (QES) Hamitonians which possess multiple algebrai...
The quasi-Gaudin algebra was introduced to construct integrable systems which are only quasi-exactly...
We propose the notion of E2-quasi-exact solvability and apply this idea to find explicit solutions t...
The original Jaynes-Cummings model is described by a Hamiltonian which is exactly solvable. Here we ...
[[abstract]]We consider quasinormal modes with complex energies from the point of view of the theory...
We construct six multi-parameter families of Hermitian quasi-exactly solvable matrix Schrodinger ope...
In this work, we present quasi-exact solutions for classes of quantum mechanical models, namely the ...
[[abstract]]In this paper we demonstrate how the recently reported exactly and quasi-exactly solvabl...
An efficient procedure for constructing quasi-exactly solvable matrix models is suggested. It is ba...
In quasi-exactly solvable problems partial analytic solution (energy spectrum and associated wavefun...
We construct a new class of quasi-exactly solvable many-body Hamiltonians in arbitrary dimensions, w...
We extend the theory of quasi-exactly solvable (QES) models with real energies to include quasinorma...
Various quasi-exact solvability conditions, involving the parameters of the periodic associated Lam{...
We show the intimate relationship between quasi-exact solvability, as expounded, for example, by A. ...
We develop a systematic procedure for constructing quantum many-body problems whose spectrum can be ...
We review three examples of quasi exactly solvable (QES) Hamitonians which possess multiple algebrai...
The quasi-Gaudin algebra was introduced to construct integrable systems which are only quasi-exactly...
We propose the notion of E2-quasi-exact solvability and apply this idea to find explicit solutions t...
The original Jaynes-Cummings model is described by a Hamiltonian which is exactly solvable. Here we ...
[[abstract]]We consider quasinormal modes with complex energies from the point of view of the theory...
We construct six multi-parameter families of Hermitian quasi-exactly solvable matrix Schrodinger ope...
In this work, we present quasi-exact solutions for classes of quantum mechanical models, namely the ...
[[abstract]]In this paper we demonstrate how the recently reported exactly and quasi-exactly solvabl...
An efficient procedure for constructing quasi-exactly solvable matrix models is suggested. It is ba...
In quasi-exactly solvable problems partial analytic solution (energy spectrum and associated wavefun...
We construct a new class of quasi-exactly solvable many-body Hamiltonians in arbitrary dimensions, w...
We extend the theory of quasi-exactly solvable (QES) models with real energies to include quasinorma...
Various quasi-exact solvability conditions, involving the parameters of the periodic associated Lam{...
We show the intimate relationship between quasi-exact solvability, as expounded, for example, by A. ...
We develop a systematic procedure for constructing quantum many-body problems whose spectrum can be ...
We review three examples of quasi exactly solvable (QES) Hamitonians which possess multiple algebrai...
The quasi-Gaudin algebra was introduced to construct integrable systems which are only quasi-exactly...
We propose the notion of E2-quasi-exact solvability and apply this idea to find explicit solutions t...