If one controls the norm of every A x, then one controls the norm of A.
If one controls the norm of every A x, ‖x‖₊ ≠ 0, then one controls the norm of A.
For a continuous real linear map f, if one controls the norm of every f x, ‖x‖₊ = 1, then
one controls the norm of f.
Alias of ContinuousLinearMap.le_opENorm.
If one controls the enorm of every f x, then one controls the enorm of f.
continuous linear maps are Lipschitz continuous.
Evaluation of a continuous linear map f at a point is Lipschitz continuous in f.
When the domain is a real normed space, ContinuousLinearMap.sSup_unitClosedBall_eq_nnnorm can
be tightened to take the supremum over only the Metric.sphere.
When the domain is a real normed space, ContinuousLinearMap.sSup_unitClosedBall_eq_norm can be
tightened to take the supremum over only the Metric.sphere.