Almost Hadamard matrices: the case of arbitrary exponents

Abstract

In our previous work, we introduced the following relaxation of the Hadamard property: a square matrix H∈ MN( R) is called "almost Hadamard" if U=H/N is orthogonal, and locally maximizes the 1-norm on O(N). We review our previous results, notably with the formulation of a new question, regarding the circulant and symmetric case. We discuss then an extension of the almost Hadamard matrix formalism, by making use of the p-norm on O(N), with p∈[1,∞]-2, with a number of theoretical results on the subject, and the formulation of some open problems.