The super Alternative Daugavet property for Banach spaces

TL;DR

The paper introduces the super alternative Daugavet property (super ADP), a refinement lying strictly between the Daugavet property and the Alternative Daugavet property, via a condition on $egin{pmatrix} x o S_X, W o B_X ext{ relative weak openness}\

Abstract

We introduce the super alternative Daugavet property (super ADP) which lies strictly between the Daugavet property and the Alternative Daugavet property as follows. A Banach space $X$ has the super ADP if for every element $x$ in the unit sphere and for every relatively weakly open subset $W$ of the unit ball intersecting the unit sphere, one can find an element $y\in W$ and a modulus one scalar $θ$ such that $\|x+θy\|$ is almost two. It is known that spaces with the Daugavet property satisfy this condition, and that this condition implies the Alternative Daugavet property. We first provide examples of super ADP spaces which fail the Daugavet property. We show that the norm of a super ADP space is rough, hence the space cannot be Asplund, and we also prove that the space fails the point of continuity property (particularly, the Radon--Nikodým property). In particular, we get examples of spaces with the Alternative Daugavet property that fail the super ADP. For a better understanding of the differences between the super ADP, the Daugavet property, and the Alternative Daugavet property, we will also consider the localizations of these three properties and prove that they behave rather differently. As a consequence, we provide characterizations of the super ADP for spaces of vector-valued continuous functions and of vector-valued integrable functions.

Figures (1)

• Figure 1: Relations between the notions

Theorems & Definitions (75)

• Proposition 1.1: kssw, MT04
• Definition 1.2
• Definition 1.3
• Proposition 2.1: KMMP
• Remark 2.2
• Proposition 3.1
• proof
• Example 3.2
• Theorem 3.3
• Lemma 3.4