8.7 Old Kiwi - Rhea

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We show that compactness fails for $p = \infty$ . Let $f_n = \chi_{(0,\frac{1}{n})}$ . We have that $||f_n||_{\infty} = 1 \ \forall n$ , so we have a bounded sequence in $L^{\infty}$ . But there can be no convergent subsequence, since $||f_n - f_m||_{\infty} = 1, n\neq m$ . $\square$

-pw

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Recent Math PhD now doing a post-doctorate at UC Riverside.

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