Minimal Projections with respect to Numerical Radius

Abstract

In this paper we survey some results on minimality of projections with respect to numerical radius. We note that in the cases Lp, p=1,2,∞, there is no difference between the minimality of projections measured either with respect to operator norm or with respect to numerical radius. However, we give an example of a projection from lp3 onto a two-dimensional subspace which is minimal with respect to norm, but not with respect to numerical radius for p≠ 1,2,∞. Furthermore, utilizing a theorem of Rudin and motivated by Fourier projections, we give a criterion for minimal projections, measured in numerical radius. Additionally, some results concerning strong unicity of minimal projections with respect to numerical radius are given.