Absolute Souslin-\({\mathcal F}\) spaces and other weak-invariants of the norm topology (Q5929007)

Let \(h: (A, \text{weak}) \to (B, \text{weak})\) be a homeomorphism where \(A\) and \(B\) are subsets of Banach spaces. Then any property that holds for \((B, \text{norm})\) whenever it holds for \((A, \text{norm})\) is said to be a weak-invariant of the norm topology. It is shown that, relative to the norm topologies on \(A\) and \(B\), the map\(h\) and its inverse are \({\mathcal F}_{\sigma}\)-measurable and take normdiscrete collections to norm \(\sigma\)-discretely decomposable collections. From this a number of properties that are weak-invariants of the norm topology are deduced.