Abstrakt
We prove that the dual unit ball of a Banach space X is a Corson compact provided that the dual unit ball with respect to every equivalent norm on X is a Valdivia compact. As a corollary we get a converse to Amir-Lindenstrauss' theorem.
We prove that the dual unit ball of a Banach space X is a Corson compact provided that the dual unit ball with respect to every equivalent norm on X is a Valdivia compact. As a corollary we get a converse to Amir-Lindenstrauss' theorem.