On orthogonal matrices maximizing the 1-norm

Teodor Banica; Benoit Collins; Jean-Marc Schlenker

doi:10.1512/iumj.2010.59.3926

On orthogonal matrices maximizing the 1-norm

Functional Analysis 2019-02-27 v1 Combinatorics Operator Algebras

Authors: Teodor Banica , Benoit Collins , Jean-Marc Schlenker

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Abstract

For $U\in O(N)$ we have $||U||_1\leq N\sqrt{N}$ , with equality if and only if $U=H/\sqrt{N}$ , with $H$ Hadamard matrix. Motivated by this remark, we discuss in this paper the algebraic and analytic aspects of the computation of the maximum of the 1-norm on O(N). The main problem is to compute the $k$ -th moment of the 1-norm, with $k\to\infty$ , and we present a number of general comments in this direction.

On orthogonal matrices maximizing the 1-norm

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