konveksian

Konveksian, or convexity, is a fundamental concept in geometry and mathematical analysis describing a property of sets and functions that behave well under linear interpolation. The term is used across disciplines such as geometry, optimization, economics, and machine learning to denote this stable, “no-holes” structure. In many languages, konveksian is the standard term for convexity.

For sets, a subset S of a real vector space is convex if, for any two points

For functions, a function f defined on a convex domain is convex if its graph lies below

Konveksian is central to convex optimization, where many problems are efficiently solvable due to these structural