Abstrakt
We show that, under some additional set-theoretical assumptions equiconsistent with the existence of a measurable cardinal, there is a weak Asplund space whose dual (with the weak* topology) is not in Stegall's class.
We show that, under some additional set-theoretical assumptions equiconsistent with the existence of a measurable cardinal, there is a weak Asplund space whose dual (with the weak* topology) is not in Stegall's class.