Definition:Norm/Bounded Linear Functional

Also see

 * Equivalence of Definitions of Norm of Linear Functional


 * Norm on Bounded Linear Functional is Finite


 * Corollary of Equivalence of Definitions of Norm of Linear Functional where it is shown, for all $h \in H$, that $\size {L h} \le \norm L \norm h$.

Special cases

 * Definition:Bounded Linear Functional
 * Definition:Norm on Bounded Linear Transformation, of which this is a special case.