A geometric approach to inequalities for the Hilbert--Schmidt norm

Abstract

We define angle X,Y between non-zero Hilbert--Schmidt operators X and Y by _X,Y = Re Tr(Y*X)\|X\|_2\|Y\|_2, and give some of its essentially properties. It is shown, among other things, that align* |_X,Y|≤ \_|X*|,|Y*|, _|X|,|Y|\. align* It enables us to provide alternative proof of some well-known inequalities for the Hilbert--Schmidt norm. In particular, we apply this inequality to prove Lee's conjecture [Linear Algebra Appl. 433 (2010), no.~3, 580--584] as follows align* \|X + Y\|_2 ≤ 2 + 12\,\|\,|X| + |Y|\,\|_2. align* A numerical example is presented to show the constant 2 + 12 is smallest possible. Other related inequalities for the Hilbert--Schmidt norm are also considered.