English

Aligned SICs and embedded tight frames in even dimensions

Quantum Physics 2019-10-24 v2 Mathematical Physics math.MP

Abstract

Alignment is a geometric relation between pairs of Weyl-Heisenberg SICs, one in dimension dd and another in dimension d(d2)d(d-2), manifesting a well-founded conjecture about a number-theoretical connection between the SICs. In this paper, we prove that if dd is even, the SIC in dimension d(d2)d(d-2) of an aligned pair can be partitioned into (d2)2(d-2)^2 tight d2d^2-frames of rank d(d1)/2d(d-1)/2 and, alternatively, into d2d^2 tight (d2)2(d-2)^2-frames of rank (d1)(d2)/2(d-1)(d-2)/2. The corresponding result for odd dd is already known, but the proof for odd dd relies on results which are not available for even dd. We develop methods that allow us to overcome this issue. In addition, we provide a relatively detailed study of parity operators in the Clifford group, emphasizing differences in the theory of parity operators in even and odd dimensions and discussing consequences due to such differences. In a final section, we study implications of alignment for the symmetry of the SIC.

Keywords

Cite

@article{arxiv.1905.09737,
  title  = {Aligned SICs and embedded tight frames in even dimensions},
  author = {Ole Andersson and Irina Dumitru},
  journal= {arXiv preprint arXiv:1905.09737},
  year   = {2019}
}

Comments

24 pages

R2 v1 2026-06-23T09:20:05.928Z