trekantsubadditivitet

Trekantsubadditivitet is a property related to functions that map elements from a set to real numbers, specifically concerning distances or norms. In simpler terms, it describes a condition where the direct distance between two points is never greater than the distance traveled by going through an intermediate point.

Mathematically, if we have a function $d(x, y)$ that represents a distance or a norm between elements

The concept of trekantsubadditivitet is fundamental in many areas of mathematics, particularly in the study of

For example, in Euclidean geometry, the distance between two points in a plane satisfies trekantsubadditivitet. If