English

$k$-Homogeneous Equiangular Tight Frames

Functional Analysis 2025-12-25 v2 Combinatorics

Abstract

We consider geometric and combinatorial characterizations of equiangular tight frames (ETFs), with the former concerning homogeneity of the vector and line symmetry groups and the latter the matroid structure. We introduce the concept of the bender of a frame, which is the collection of short circuits, which in turn are the dependent subsets of frame vectors of minimum size. We also show that ETFs with kk-homogeneous line symmetry groups have benders which are kk-designs. Paley ETFs are a known class of ETFs constructed using number theory. We determine the line and vector symmetry groups of all Paley ETFs and show that they are 22-homogeneous. We additionally characterize all kk-homogeneous ETFs for k3k\geq 3. Finally, we revisit David Larson's AMS Memoirs \emph{Frames, Bases, and Group Representations} coauthored with Deguang Han and \emph{Wandering Vectors for Unitary Systems and Orthogonal Wavelets} coauthored with Xingde Dai with a modern eye and focus on finite-dimensional Hilbert spaces.

Cite

@article{arxiv.2505.00160,
  title  = {$k$-Homogeneous Equiangular Tight Frames},
  author = {Emily J. King},
  journal= {arXiv preprint arXiv:2505.00160},
  year   = {2025}
}
R2 v1 2026-06-28T23:17:25.402Z