Disjointly homogeneous Orlicz spaces revisited

Abstract

Let 1 p∞. A Banach lattice X is said to be p-disjointly homogeneous or (p-DH) (resp. restricted (p-DH)) if every normalized disjoint sequence in X (resp. every normalized sequence of characteristic functions of disjoint subsets) contains a subsequence equivalent in X to the unit vector basis of p. We revisit DH-properties of Orlicz spaces and refine some previous results of this topic, showing that (p-DH)-property is not stable in the class of Orlicz spaces and the classes of restricted (p-DH) and (p-DH) Orlicz spaces are different. Moreover, we give a characterization of uniform (p-DH) Orlicz spaces and establish also closed connections between this property and the duality of DH-property.