The Energy of the Ground State of the Two-Dimensional Hamiltonian of a Parabolic Quantum Well in the Presence of an Attractive Gaussian Impurity

In this article, we provide an expansion (up to the fourth order of the coupling constant) of the energy of the ground state of the Hamiltonian of a quantum mechanical particle moving inside a parabolic well in the x-direction and constrained by the presence of a two-dimensional impurity, modelled by an attractive two-dimensional isotropic Gaussian potential. By investigating the associated Birman-Schwinger operator and exploiting the fact that such an integral operator is Hilbert-Schmidt, we use the modified Fredholm determinant in order to compute the energy of the ground state created by the impurity.

Automated summary

This article provides an expansion (up to the fourth order of the coupling constant) of the energy of the ground state of a quantum mechanical particle moving inside a parabolic well in the x-direction constrained by a two-dimensional impurity modelled by an attractive two-dimensional isotropic Gaussian potential, through investigating the associated Birman-Schwinger operator and using the modified Fredholm determinant to compute the energy of the ground state created by the impurity.