English

Linear Programming Bounds on $k$-Uniform States

Quantum Physics 2025-03-05 v1

Abstract

The existence of kk-uniform states has been a widely studied problem due to their applications in several quantum information tasks and their close relation to combinatorial objects like Latin squares and orthogonal arrays. With the machinery of quantum enumerators and linear programming, we establish several improved non-existence results and bounds on kk-uniform states. 1. First, for any fixed l1l\geq 1 and q2q\geq 2, we show that there exists a constant cc such that (n/2l)(\left\lfloor{n/2}\right\rfloor-l)-uniform states in (Cq)n(\mathbb{C}^q)^{\otimes n} do not exist when ncq2+o(q2)n\geq cq^2+o(q^2). The constant cc equals 44 when l=1l=1 and 66 when l=2l=2, which generalizes Scott's bound (2004) for l=0l=0. 2. Second, when nn is sufficiently large, we show that there exists a constant θ<1/2\theta<1/2 for each q9q \le 9, such that kk-uniform states in (Cq)n(\mathbb{C}^q)^{\otimes n} exist only when kθnk\leq \theta n. In particular, this provides the first bound (to the best of our knowledge) of kk for 4q94\leq q\leq 9 and confirms a conjecture posed by Shi et al. (2023) when q=5q=5 in a stronger form. 3. Finally, we improve the shadow bounds given by Shi et al. (2023) by a constant for q=3,4,5q = 3,4,5 and small nn. When q=4q=4, our results can update some bounds listed in the code tables maintained by Grassl (2007--2024).

Keywords

Cite

@article{arxiv.2503.02222,
  title  = {Linear Programming Bounds on $k$-Uniform States},
  author = {Yu Ning and Fei Shi and Tao Luo and Xiande Zhang},
  journal= {arXiv preprint arXiv:2503.02222},
  year   = {2025}
}
R2 v1 2026-06-28T22:05:44.230Z