Permutation-invariant qudit codes from polynomials
Abstract
A permutation-invariant quantum code on qudits is any subspace stabilized by the matrix representation of the symmetric group as permutation matrices that permute the underlying subsystems. When each subsystem is a complex Euclidean space of dimension , any permutation-invariant code is a subspace of the symmetric subspace of We give an algebraic construction of new families of of -dimensional permutation-invariant codes on at least qudits that can also correct errors for . The construction of our codes relies on a real polynomial with multiple roots at the roots of unity, and a sequence of real polynomials that satisfy some combinatorial constraints. When , we prove constructively that an uncountable number of such codes exist.
Cite
@article{arxiv.1604.07925,
title = {Permutation-invariant qudit codes from polynomials},
author = {Yingkai Ouyang},
journal= {arXiv preprint arXiv:1604.07925},
year = {2017}
}
Comments
14 pages. Minor corrections made, to appear in Linear Algebra and its Applications