Borg's Periodicity Theorems for first order self-adjoint systems with complex potentials
Spectral Theory
2017-07-05 v1
Abstract
A self-adjoint first order system with Hermitian -periodic potential , integrable on compact sets, is considered. It is shown that all zeros of are double zeros if and only if this self-adjoint system is unitarily equivalent to one in which is -periodic. Furthermore, the zeros of are all double zeros if and only if the associated self-adjoint system is unitarily equivalent to one in which . Here denotes the discriminant of the system and , are Pauli matrices. Finally, it is shown that all instability intervals vanish if and only if , for some real valued -periodic functions and integrable on compact sets.
Keywords
Cite
@article{arxiv.1707.00982,
title = {Borg's Periodicity Theorems for first order self-adjoint systems with complex potentials},
author = {Sonja Currie and Thomas Tobias Roth and Bruce Alastair Watson},
journal= {arXiv preprint arXiv:1707.00982},
year = {2017}
}