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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 π\pi-periodic potential Q(z)Q(z), integrable on compact sets, is considered. It is shown that all zeros of Δ+2ei0πqdt\Delta + 2e^{-i\int_0^\pi \Im q dt} are double zeros if and only if this self-adjoint system is unitarily equivalent to one in which Q(z)Q(z) is π2\frac{\pi}{2}-periodic. Furthermore, the zeros of Δ2ei0πqdt\Delta - 2e^{-i\int_0^\pi \Im q dt} are all double zeros if and only if the associated self-adjoint system is unitarily equivalent to one in which Q(z)=σ2Q(z)σ2Q(z) = \sigma_2 Q(z) \sigma_2. Here Δ\Delta denotes the discriminant of the system and σ0\sigma_0, σ2\sigma_2 are Pauli matrices. Finally, it is shown that all instability intervals vanish if and only if Q=rσ0+qσ2Q = r\sigma_0 + q\sigma_2, for some real valued π\pi-periodic functions rr and qq 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}
}
R2 v1 2026-06-22T20:37:33.062Z