Qubit stabilizer states are complex projective 3-designs
Abstract
A complex projective -design is a configuration of vectors which is ``evenly distributed'' on a sphere in the sense that sampling uniformly from it reproduces the moments of Haar measure up to order . We show that the set of all -qubit stabilizer states forms a complex projective -design in dimension . Stabilizer states had previously only been known to constitute -designs. The main technical ingredient is a general recursion formula for the so-called frame potential of stabilizer states. To establish it, we need to compute the number of stabilizer states with pre-described inner product with respect to a reference state. This, in turn, reduces to a counting problem in discrete symplectic vector spaces for which we find a simple formula. We sketch applications in quantum information and signal analysis.
Cite
@article{arxiv.1510.02767,
title = {Qubit stabilizer states are complex projective 3-designs},
author = {Richard Kueng and David Gross},
journal= {arXiv preprint arXiv:1510.02767},
year = {2015}
}
Comments
12 pages, 0 figures. See also closely related work by Zhu and by Webb