Almost Hadamard matrices: general theory and examples

Teodor Banica; Ion Nechita; Karol Zyczkowski

arXiv:1202.2025·math.CO·February 19, 2013·Open Syst. Inf. Dyn.

Almost Hadamard matrices: general theory and examples

Teodor Banica, Ion Nechita, Karol Zyczkowski

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TL;DR

This paper introduces the concept of almost Hadamard matrices, exploring their properties, special cases like circulant and two-entry matrices, and providing new examples and norm calculations.

Contribution

It develops a general theory of almost Hadamard matrices, including detailed analysis of specific cases and construction of new examples.

Findings

01

Characterization of almost Hadamard matrices as local maxima of the 1-norm

02

Construction of new families of almost Hadamard matrices

03

Norm computations for specific matrix classes

Abstract

We develop a general theory of "almost Hadamard matrices". These are by definition the matrices $H \in M_{N} (R)$ having the property that $U = H / N$ is orthogonal, and is a local maximum of the 1-norm on O(N). Our study includes a detailed discussion of the circulant case ( $H_{ij} = γ_{j - i}$ ) and of the two-entry case ( $H_{ij} \in x, y$ ), with the construction of several families of examples, and some 1-norm computations.

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Taxonomy

Topicsgraph theory and CDMA systems · Optical Network Technologies · Matrix Theory and Algorithms