On a Norm Compression Inequality for 2XN Partitioned Block Matrices
Functional Analysis
2013-04-23 v2
Abstract
We conjecture the following so-called norm compression inequality for partitioned block matrices and the Schatten -norms: for , ||({array}{cccc} A_1 & A_2 & ... & A_N B_1 & B_2 & >... & B_N {array})||_p \le ||({array}{cccc} ||A_1||_p & ||A_2||_p & ... & ||A_N||_p \ ||B_1||_p & ||B_2||_p & ... & ||B_N||_p {array})||_p while for the ordering of the inequality is reversed. This inequality includes Hanner's inequality for matrices as a special case. We prove several special cases of this inequality and give examples for and larger partitionings where it does not hold.
Cite
@article{arxiv.math/0702186,
title = {On a Norm Compression Inequality for 2XN Partitioned Block Matrices},
author = {Koenraad M. R. Audenaert},
journal= {arXiv preprint arXiv:math/0702186},
year = {2013}
}
Comments
22 pages; mistake in section on duality corrected, additional results added