Does every Banach space admit an equivalent strictly convex norm (i.e. such a norm, that a unit sphere does not contain segments)?
$\begingroup$
$\endgroup$
1
asked Jul 3, 2010 at 20:50
-
$\begingroup$ mathoverflow.net/a/151956/15129 $\endgroup$– Tomasz KaniaCommented Mar 26, 2018 at 20:37
Add a comment
|
1 Answer
$\begingroup$
$\endgroup$
Every separable Banach space has an equivalent norm which is both strictly convex and smooth. For certain nonseparable spaces, in particular, $\ell_{\infty}(\Gamma)$ with $\Gamma$ uncountable, there may be no equivalent strictly convex or smooth norm.
answered Jul 3, 2010 at 20:57