Geometry of the space of compact operators endowed with the numerical radius norm

Abstract

We investigate the space of bounded linear operators on a Banach space equipped with a norm which is equivalent to the operator norm such that the subspace of compact operators is an M-ideal. In particular, we observe that the space of compact operators on p (1<p<∞) equipped with the numerical radius norm is an M-ideal whenever the numerical index of p is not 0. On the other hand, we show that the space of compact operators on a Banach space containing an isomorphic copy of 1 whose numerical index is greater than 1/2 is not M-ideals. We also study the proximinality, the existence of farthest points and the compact perturbation property for the numerical radius.

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