In functional analysis, a branch of mathematics, a bounding point of a subset of a vector space is a conceptual extension of the boundary of a set.

Definition

Let A {\displaystyle A} be a subset of a vector space X {\displaystyle X} . Then x X {\displaystyle x\in X} is a bounding point for A {\displaystyle A} if it is neither an internal point for A {\displaystyle A} nor its complement.

References


Bounding boxes around the GPS data points machines carrying different

8 key points The 8 key points are defined as rectified of the bounding

Punkt punkt point dot

Bounding points Autodesk Community

Graphical representation of the optimal point distribution. Bounding