Add to ORKGVarious quasi-exact solvability conditions, involving the parameters of the periodic associated Lam{\'e} potential, are shown to emerge naturally in the quantum Hamilton-Jacobi approach. It is found that, the intrinsic nonlinearity of the Riccati type quantum Hamilton-Jacobi equation is primarily responsible for the surprisingly large number of allowed solvability conditions in the associated Lam{\'e} case. We also study the singularity structure of the quantum momentum function, which yields the band edge eigenvalues and eigenfunctions
Abstract. — In this paper we prove an abstract KAM theorem for infinite dimensional Hamiltonians sys...
The original Jaynes-Cummings model is described by a Hamiltonian which is exactly solvable. Here we ...
We consider Hamiltonians, which are even polynomials of the forth order with the respect to Bose ope...
In this thesis the quantum Hamilton - Jacobi (QHJ) formalism is used for (i) potentials which exhibi...
We study the quantum Hamilton-Jacobi (QHJ) equation of the recently obtained exactly solvable models...
In this work, we present quasi-exact solutions for classes of quantum mechanical models, namely the ...
We make use of the Quantum Hamilton-Jacobi (QHJ) theory to investigate conditional quasi-solvability...
We make use of the quantum Hamilton-Jacobi (QHJ) theory to investigate conditional quasisolvability ...
We introduce a new concept of infinite quasi-exactly solvable models which are constructable through...
We analyze the Scarf potential, which exhibits both discrete energy bound states and energy bands, t...
We show the intimate relationship between quasi-exact solvability, as expounded, for example, by A. ...
Abstract. A new two-parameter family of quasi-exactly solvable quartic polynomial potentials V (x) =...
[[abstract]]Exact and quasi-exact solvabilities of the one-dimensional Schrödinger equation are disc...
We make use of the quantum Hamilton-Jacobi (QHJ) theory to investigate conditional quasisolvability ...
We review three examples of quasi exactly solvable (QES) Hamitonians which possess multiple algebrai...
Abstract. — In this paper we prove an abstract KAM theorem for infinite dimensional Hamiltonians sys...
The original Jaynes-Cummings model is described by a Hamiltonian which is exactly solvable. Here we ...
We consider Hamiltonians, which are even polynomials of the forth order with the respect to Bose ope...
In this thesis the quantum Hamilton - Jacobi (QHJ) formalism is used for (i) potentials which exhibi...
We study the quantum Hamilton-Jacobi (QHJ) equation of the recently obtained exactly solvable models...
In this work, we present quasi-exact solutions for classes of quantum mechanical models, namely the ...
We make use of the Quantum Hamilton-Jacobi (QHJ) theory to investigate conditional quasi-solvability...
We make use of the quantum Hamilton-Jacobi (QHJ) theory to investigate conditional quasisolvability ...
We introduce a new concept of infinite quasi-exactly solvable models which are constructable through...
We analyze the Scarf potential, which exhibits both discrete energy bound states and energy bands, t...
We show the intimate relationship between quasi-exact solvability, as expounded, for example, by A. ...
Abstract. A new two-parameter family of quasi-exactly solvable quartic polynomial potentials V (x) =...
[[abstract]]Exact and quasi-exact solvabilities of the one-dimensional Schrödinger equation are disc...
We make use of the quantum Hamilton-Jacobi (QHJ) theory to investigate conditional quasisolvability ...
We review three examples of quasi exactly solvable (QES) Hamitonians which possess multiple algebrai...
Abstract. — In this paper we prove an abstract KAM theorem for infinite dimensional Hamiltonians sys...
The original Jaynes-Cummings model is described by a Hamiltonian which is exactly solvable. Here we ...
We consider Hamiltonians, which are even polynomials of the forth order with the respect to Bose ope...