### Definition of Simple closed curve

1. Noun. A closed curve that does not intersect itself.

Exact synonyms: Jordan Curve
Generic synonyms: Closed Curve
Specialized synonyms: Loop

### Lexicographical Neighbors of Simple Closed Curve

 simpkinssimplesimple(a)simple-central anisocoriasimple-heartedsimple-mindedsimple-mindednesssimple-pastsimple-presentsimple English simple absencesimple anchoragesimple anisocoriasimple beamsimple bone cystsimple closed curve (current term)simple closuresimple coloursimple conjunctivitissimple connectedness simple connectivitysimple crus of semicircular ductsimple diplopiasimple dislocationsimple epitheliumsimple eyesimple fissionsimple fractionsimple fracturesimple fruit

### Literary usage of Simple closed curve

Below you will find example usage of this term as found in modern and/or classical literature:

1. Proceedings of the Cambridge Philosophical Society by Cambridge Philosophical Society (1843)
"By A-operations on C0, C^,... in turn it is possible to transfer the frond to a base on a simple closed curve without altering its degree. ..."

2. Projective Geometry by Oswald Veblen, John Wesley Young (1918)
"Any simple closed curve consisting of points in or on the boundary of a 2•cell R (§ 155) is the boundary of a unique 2•cell which consists entirely of ..."

3. Projective Geometry by Oswald Veblen, John Wesley Young (1918)
"Any simple closed curve consisting of points in or on the boundary of a 2-cell R (§ 155) is the boundary of a unique 2-cell which consists entirely of ..."

4. Bulletin of the American Mathematical Society by American Mathematical Society (1919)
"Schoenflies* has formulated a set of conditions under which the common boundary of two domains will be a simple closed curve. A different set has been given ..."

5. A Treatise on the Analytical Dynamics of Particles and Rigid Bodies: With an by Edmund Taylor Whittaker (1904)
"Then, in the same way, it can be shewn tha diminished when any simple closed curve IX, enclosed by DD, is taken instead of D as the path of integration. ..."