In the mathematical theory of knots, the Fary–Milnor theorem, named after István Fáry and John Milnor, states that three-dimensional smooth curves with small total curvature must be unknotted. The theorem was proved independently by Fáry in 1949 and Milnor in 1950.
Statement of the theorem 
If K is any closed curve in Euclidean space that is sufficiently smooth to define the curvature κ at each of its points, and if the total curvature is less than or equal to 4π, then K is an unknot, i.e.:
The contrapositive tells us that if K is not an unknot, i.e. K is not isotopic to the circle, then the total curvature will be strictly greater than 4π. Notice that having the total curvature less than or equal to 4π is merely a sufficient condition for K to be an unknot; it is not a necessary condition. In other words, although all knots with total curvature less than or equal to 4π are the unknot, there exist unknots with curvature strictly greater that 4π.
Generalizations to non-smooth curves 
For closed polygonal chains the same result holds with the integral of curvature replaced by the sum of angles between adjacent segments of the chain. By approximating arbitrary curves by polygonal chains one may extend the definition of total curvature to larger classes of curves, within which the Fary–Milnor theorem also holds (Milnor 1950, Sullivan 2007).
- Fary, I. (1949), "Sur la courbure totale d’une courbe gauche faisant un nœud", Bulletin de la Société Mathématique de France 77: 128–138.
- Milnor, J. W. (1950), "On the total curvature of knots", Annals of Mathematics 52 (2): 248–257, doi:10.2307/1969467.
- Sullivan, John M. (2007). "Curves of finite total curvature". arXiv:math/0606007..
- Fenner, Stephen A. (1990), The total curvature of a knot (long). Fenner describes a geometric proof of the theorem, and of the related theorem that any smooth closed curve has total curvature at least 2π.