Are there "small cardinal models" of a Banach space, whose dual space is in Stegall`s class, but it is not weak*-fragmentable, or large cardinals are a must?

Abstract

It is well-known that if Y is a Banach space the weak*-fragmentability of its dual space by some metric implies that Y* belongs to the Stegall class -- the former for shortly W*F, being the latter S and hence Y is weak Asplund -- call it WA . It has been proved by O. Kalenda and Kunen that existence of a measurable cardinal implies (it is consistent) that, for instance in the construction of Kalenda Compacts - this space is in the Stegall`s class iff both inclusions of classes are strictly proper. The same authors made following question, is there a model of ZFC, in which the inclusion of WA in S actually is equality. Obviously, because of their result the existence of large cardinals ( supercompacts, strongly-compacts, strong cardinals, huge cardinals, Vopenka principle) would be a models of the proper inclusion of the above - mentioned classes, being with more consistency power even, see Thomas Jech [TJ03] and Saharon Shelah [SSH17].