Topological and metric properties of convex sets in normed spaces #
We prove the following facts:
convexOn_norm
,convexOn_dist
: norm and distance to a fixed point is convex on any convex set;convexOn_univ_norm
,convexOn_univ_dist
: norm and distance to a fixed point is convex on the whole space;convexHull_ediam
,convexHull_diam
: convex hull of a set has the same (e)metric diameter as the original set;bounded_convexHull
: convex hull of a set is bounded if and only if the original set is bounded.
The norm on a real normed space is convex on any convex set. See also Seminorm.convexOn
and convexOn_univ_norm
.
The norm on a real normed space is convex on the whole space. See also Seminorm.convexOn
and convexOn_norm
.
Given a point x
in the convex hull of s
and a point y
, there exists a point
of s
at distance at least dist x y
from y
.
Given a point x
in the convex hull of s
and a point y
in the convex hull of t
,
there exist points x' ∈ s
and y' ∈ t
at distance at least dist x y
.
Emetric diameter of the convex hull of a set s
equals the emetric diameter of s
.
Diameter of the convex hull of a set s
equals the emetric diameter of s
.
Convex hull of s
is bounded if and only if s
is bounded.
Equations
- (_ : PathConnectedSpace E) = (_ : PathConnectedSpace E)
Equations
- (_ : LocPathConnectedSpace E) = (_ : LocPathConnectedSpace E)
The set of vectors in the same ray as x
is connected.
The set of nonzero vectors in the same ray as the nonzero vector x
is connected.