Is it true that the closed convex hull of a compact subset of the dual equipped with the w*-topology is compact?

311 Views Asked by Bumbble Comm At 27 Mar 2026 - 4:58

Let $X$ be a Banach space. Consider the dual $X^*$ equipped with the weak*-topology.

Is it true that the closed convex hull of a compact subset $K$ of the dual $X^*$ is compact?

ps: I know that the closed convex hull of a compact subset of a Banach space is compact.