$\delta$-Function Perturbations and Boundary Problems by Path Integration
Abstract
A wide class of boundary problems in quantum mechanics is discussed by using path integrals. This includes motion in half-spaces, radial boxes, rings, and moving boundaries. As a preparation the formalism for the incorporation of -function perturbations is outlined, which includes the discussion of multiple -function perturbations, -function perturbations along perpendicular lines and planes, and moving -function perturbations. The limiting process, where the strength of the -function perturbations gets infinite repulsive, has the effect of producing impenetrable walls at the locations of the -function perturbations, i.e.\ a consistent description for boundary problems with Dirichlet boundary-condition emerges. Several examples illustrate the formalism.
Cite
@article{arxiv.hep-th/9302055,
title = {$\delta$-Function Perturbations and Boundary Problems by Path Integration},
author = {Christian Grosche},
journal= {arXiv preprint arXiv:hep-th/9302055},
year = {2016}
}
Comments
35 pages, amstex, preprint SISSA/18/93/FM