A Classification of Order Convergence via a Transfinite Fatou Hierarchy

Abstract

We investigate the descriptive complexity of order convergence in separable Banach lattices. While uniform convergence is Borel and σ-order convergence is known to be 12, it is unclear in general when σ-order convergence is analytic. We introduce a transfinite hierarchy of weakenings of the classical Fatou property, indexed by countable ordinals, and show that it provides a complete structural classification of this definability problem. For a separable Banach lattice X, we prove that the following are equivalent: (i) the set of decreasing positive sequences with infimum zero is Borel; (ii) σ-order convergence is analytic; and (iii) X satisfies the α-Fatou property for some countable ordinal α. We further establish that the hierarchy is proper: for every countable ordinal α there exists a separable Banach lattice with a countable π-basis that fails to be α-Fatou, but is β-Fatou for some β>α. Thus the Borel definability of order convergence is governed by a canonical ordinal invariant intrinsic to the lattice, and the descriptive complexity can be arbitrarily high below ω1. These results identify projective complexity as a genuine structural invariant in Banach lattice theory.