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- Affine_geometry_of_curves abstract "In the mathematical field of differential geometry, the affine geometry of curves is the study of curves in an affine space, and specifically the properties of such curves which are invariant under the special affine group In the classical Euclidean geometry of curves, the fundamental tool is the Frenet–Serret frame. In affine geometry, the Frenet–Serret frame is no longer well-defined, but it is possible to define another canonical moving frame along a curve which plays a similar decisive role. The theory was developed in the early 20th century, largely from the efforts of Wilhelm Blaschke and Jean Favard.".
- Affine_geometry_of_curves wikiPageID "15967139".
- Affine_geometry_of_curves wikiPageRevisionID "462478782".
- Affine_geometry_of_curves hasPhotoCollection Affine_geometry_of_curves.
- Affine_geometry_of_curves subject Category:Affine_geometry.
- Affine_geometry_of_curves subject Category:Curves.
- Affine_geometry_of_curves subject Category:Differential_geometry.
- Affine_geometry_of_curves type Abstraction100002137.
- Affine_geometry_of_curves type Attribute100024264.
- Affine_geometry_of_curves type Curve113867641.
- Affine_geometry_of_curves type Curves.
- Affine_geometry_of_curves type Line113863771.
- Affine_geometry_of_curves type Shape100027807.
- Affine_geometry_of_curves comment "In the mathematical field of differential geometry, the affine geometry of curves is the study of curves in an affine space, and specifically the properties of such curves which are invariant under the special affine group In the classical Euclidean geometry of curves, the fundamental tool is the Frenet–Serret frame.".
- Affine_geometry_of_curves label "Affine geometry of curves".
- Affine_geometry_of_curves sameAs m.03qjh7k.
- Affine_geometry_of_curves sameAs Q4688941.
- Affine_geometry_of_curves sameAs Q4688941.
- Affine_geometry_of_curves sameAs Affine_geometry_of_curves.
- Affine_geometry_of_curves wasDerivedFrom Affine_geometry_of_curves?oldid=462478782.
- Affine_geometry_of_curves isPrimaryTopicOf Affine_geometry_of_curves.