How to prove that the closed convex hull of a compact subset of a Banach space is compact?

compactness convex-analysis banach-spaces

Solution 1:

Since $X$ is complete it is enough to show that $\mathrm{hull}(K)$ is completely bounded.

The proof of this fact you can find in theorem 3.24 in Rudin's Functional analysis. This proof follows the same steps proposed by Harald Hanche-Olsen.

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