AxiomOfChoice
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Apparently - that is, if I'm to believe Kolmogorov - we have the following for a bounded linear operator A between two normed spaces:
[tex] \sup_{\| x \| \leq 1} \|Ax\| = \sup_{\|x\| = 1} \|Ax\|[/tex]
But why?
[tex] \sup_{\| x \| \leq 1} \|Ax\| = \sup_{\|x\| = 1} \|Ax\|[/tex]
But why?
All I know of the open mapping theorem is that a continuous linear map from one Banach space onto another Banach space is an open mapping. Do we know that our functional - which I'm guessing is [itex]f(x) = \|Ax\|[/itex] so that [itex]f: X \to \mathbb R[/itex] - is onto?