Transfinite Daugavet property

Abstract

We extend the Daugavet property and a perfect version of it to transfinite cardinals in order to distinguish between spaces with the ordinary Daugavet property by some kind of complexity (topological, density…), providing a number of examples and results. First, we characterise the transfinite Daugavet C(K) spaces in terms of a cardinal index r(K), which generalises the notion of the reaping number of a Boolean algebra. Besides, the perfect Daugavet property characterizes the absence of Gδ-points in K. We also study several inheritance results of the transfinite Daugavet properties by almost isometric ideals, absolute sums, and tensor product spaces, with a number of applications. We classify these properties for L1(μ) and L∞(μ) spaces in terms of the Maharam's decomposition of the measure. We also show that the space of Lipschitz functions (M) on a complete length metric space has the ω-perfect Daugavet property, improving the previous knowledge.