rumkurver

Rumkurver are smooth curves embedded in three-dimensional Euclidean space. In mathematics they are described by a vector-valued function r(t) = (x(t), y(t), z(t)) defined on an interval I ⊂ R. Often one reparameterizes by arc length s, in which case ||dr/ds|| = 1.

If the image of r lies entirely in a plane, the curve is planar; otherwise it is

Two basic quantities are curvature κ(s) and torsion τ(s). With respect to arc length, T(s) = r'(s) is

Examples: a circular helix r(t) = (R cos t, R sin t, h t) is a space curve

Applications and relevance: space curves arise in differential geometry and the study of curves in 3D space;

History and terminology: the concept is foundational in differential geometry; the Frenet-Serret frame is named after