English

Squash Operator and Symmetry

Quantum Physics 2010-03-16 v2

Abstract

This paper begins with a simple proof of the existence of squash operators compatible with the Bennett-Brassard 1984 (BB84) protocol which suits single-mode as well as multi-mode threshold detectors. The proof shows that, when a given detector is symmetric under cyclic group C_4, and a certain observable associated with it has rank two as a matrix, then there always exists a corresponding squash operator. Next, we go on to investigate whether the above restriction of "rank two" can be eliminated; i.e., is cyclic symmetry alone sufficient to guarantee the existence of a squash operator? The motivation behind this question is that, if this were true, it would imply that one could realize a device-independent and unconditionally secure quantum key distribution protocol. However, the answer turns out to be negative, and moreover, one can instead prove a no-go theorem that any symmetry is, by itself, insufficient to guarantee the existence of a squash operator.

Cite

@article{arxiv.0910.2326,
  title  = {Squash Operator and Symmetry},
  author = {Toyohiro Tsurumaru},
  journal= {arXiv preprint arXiv:0910.2326},
  year   = {2010}
}

Comments

4 pages, no figures; minor grammatical corrections

R2 v1 2026-06-21T13:57:36.462Z