normerade

Normerade is the Swedish term used in mathematics to refer to normed spaces. A normed space is a vector space V over the real or complex numbers equipped with a norm ||·||: V → [0, ∞) that satisfies positivity, definiteness (||x|| = 0 iff x = 0), homogeneity (||αx|| = |α|·||x|| for all scalars α), and the triangle inequality (||x + y|| ≤ ||x|| + ||y||). The norm induces a metric d(x, y) = ||x − y||, which defines notions of distance, convergence, and continuity on V.

Examples include R^n with the Euclidean norm ||x||2, and function spaces such as L^p spaces on a

A normed space that is complete with respect to its norm-derived metric is called a Banach space.

History and terminology: the concept of a norm evolved in the early 20th century, with Banach spaces

See also: norm, Banach space, Lp spaces, Hilbert space, functional analysis.