One-dimensional Schroedinger operators with delta-prime-interactions on Cantor-type sets
arXiv:1401.7581 · doi:10.1016/j.jde.2014.04.005
Abstract
We introduce a novel approach for defining a $δ'$-interaction on a subset of the real line of Lebesgue measure zero which is based on Sturm-Liouville differential expression with measure coefficients. This enables us to establish basic spectral properties (e.g., self-adjointness, lower semiboundedness and spectral asymptotics) of Hamiltonians with $δ'$-interactions concentrated on sets of complicated structures.
30 pages