FA16

From Exampleproblems

Jump to: navigation, search

Let $X\,$ be a normed space and $x,y\isin X\,$ . Prove that if $f(x)=f(y)\,$ for every bounded linear functional $f\,$ on $X\,$ , then $x=y\,$ .

Retrieved from "http://www.exampleproblems.com/wiki/index.php/FA16"

Views

Personal tools

Log in

Search

Toolbox

Get A Wifi Network Switcher Widget for Android