niveausæt

Niveausæt, or level set, refers to a fundamental concept in mathematics for a real-valued function. If f is defined on a domain D with values in the real numbers, the niveausæt corresponding to a chosen level c is the set of all points x in D for which f(x) = c. This set is often written as f−1({c}) and is also described as the contour at value c.

A level set should be distinguished from a sublevel set, which consists of points where f(x) ≤ c.

Examples help illustrate the idea. For f(x, y) = x^2 + y^2, the level set f(x, y) = c

Key properties include topology and smoothness. If f is continuous, a level set is closed, and if

Related concepts include isocontours, iso-values, and the level-set method, a computational approach for tracking evolving interfaces.