On various types of density of numerical radius attaining operators

Abstract: In this paper, we are interested in studying two properties related to the denseness of the operators which attain their numerical radius: the Bishop-Phelps-Bollobás point and operator properties for numerical radius (BPBpp-nu and BPBop-nu, respectively). We prove that every Banach space with micro-transitive norm and second numerical index strictly positive satisfy the BPBpp-nu and that, if the numerical index of X is 1, only one-dimensional spaces enjoy it. On the other hand we show that the BPBop-nu is a ve… Show more