L-orthogonality in Daugavet centers and narrow operators

Abstract

We study the presence of L-orthogonal elements in connection with Daugavet centers and narrow operators. We prove that, if (Y)≤ ω1 and G:X Y is a Daugavet center, then G(W) contains some L-orthogonal for every non-empty w*-open subset of BX**. In the context of narrow operators, we show that if X is separable and T:X Y is a narrow operator, then given y∈ BX and any non-empty w*-open subset W of BX** then W contains some L-orthogonal u so that T**(u)=T(y). In the particular case that T*(Y*) is separable, we extend the previous result to (X)=ω1. Finally, we prove that none of the previous results holds in larger density characters (in particular, a counterexample is shown for ω2 under continuum hypothesis).