English

Dimension-counting bounds for equi-isoclinic subspaces

Information Theory 2025-11-26 v1 Combinatorics Functional Analysis math.IT Metric Geometry

Abstract

We make four contributions to the theory of optimal subspace packings and equi-isoclinic subspaces: (1) a new lower bound for block coherence, (2) an exact count of equi-isoclinic subspaces of even dimension rr in R2r+1\mathbb{R}^{2r+1} with parameter α12\alpha \neq \tfrac{1}{2}, (3) a new upper bound for the number of rr-dimensional equi-isoclinic subspaces in Rd\mathbb{R}^d or Cd\mathbb{C}^d, and (4) a proof that when d=2rd=2r, a further refinement of this bound is attained for every rr in the complex case and every r=2kr=2^k in the real case. For each of these contributions, the proof ultimately relies on a dimension count.

Keywords

Cite

@article{arxiv.2511.20642,
  title  = {Dimension-counting bounds for equi-isoclinic subspaces},
  author = {Joseph W. Iverson and Kaysie Rose O},
  journal= {arXiv preprint arXiv:2511.20642},
  year   = {2025}
}
R2 v1 2026-07-01T07:54:47.529Z