Modular Welch Bounds with Applications
Abstract
We prove the following two results. \begin{enumerate} \item Let be a unital commutative C*-algebra and be the standard Hilbert C*-module over . Let . If is any collection of vectors in such that , , then \begin{align*} \max _{1\leq j,k \leq n, j\neq k}\|\langle \tau_j, \tau_k\rangle ||^{2m}\geq \frac{1}{n-1}\left[\frac{n}{{d+m-1\choose m}}-1\right], \quad \forall m \in \mathbb{N}. \end{align*} \item Let be a -finite commutative W*-algebra or a commutative AW*-algebra and be a rank d Hilbert C*-module over . Let . If is any collection of vectors in such that , , then \begin{align*} \max _{1\leq j,k \leq n, j\neq k}\|\langle \tau_j, \tau_k\rangle ||^{2m}\geq \frac{1}{n-1}\left[\frac{n}{{d+m-1\choose m}}-1\right], \quad \forall m \in \mathbb{N}. \end{align*} \end{enumerate} Results (1) and (2) reduce to the famous result of Welch [\textit{IEEE Transactions on Information Theory, 1974}] obtained 48 years ago. We introduce the notions of modular frame potential, modular equiangular frames and modular Grassmannian frames. We formulate Zauner's conjecture for Hilbert C*-modules.
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Cite
@article{arxiv.2201.00319,
title = {Modular Welch Bounds with Applications},
author = {K. Mahesh Krishna},
journal= {arXiv preprint arXiv:2201.00319},
year = {2022}
}
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