In differential geometry Dupin's theorem, named after the French mathematician Charles Dupin, is the statement:[1]
A threefold orthogonal system of surfaces consists of three pencils of surfaces such that any pair of surfaces out of different pencils intersect orthogonally.
The most simple example of a threefold orthogonal system consists of the coordinate planes and their parallels. But this example is of no interest, because a plane has no curvature lines.
A simple example with at least one pencil of curved surfaces: 1) all right circular cylinders with the z-axis as axis, 2) all planes, which contain the z-axis, 3) all horizontal planes (see diagram).
A curvature line is a curve on a surface, which has at any point the direction of a principal curvature (maximal or minimal curvature). The set of curvature lines of a right circular cylinder consists of the set of circles (maximal curvature) and the lines (minimal curvature). A plane has no curvature lines, because any normal curvature is zero. Hence, only the curvature lines of the cylinder are of interest: A horizontal plane intersects a cylinder at a circle and a vertical plane has lines with the cylinder in common.
The idea of threefold orthogonal systems can be seen as a generalization of orthogonal trajectories. Special examples are systems of confocal conic sections.
Dupin's theorem is a tool for determining the curvature lines of a surface by intersection with suitable surfaces (see examples), without time-consuming calculation of derivatives and principal curvatures. The next example shows, that the embedding of a surface into a threefold orthogonal system is not unique.
Given: A right circular cone, green in the diagram.
Wanted: The curvature lines.1. pencil: Shifting the given cone C with apex S along its axis generates a pencil of cones (green).
2. pencil: Cones with apexes on the axis of the given cone such that the lines are orthogonal to the lines of the given cone (blue).
3. pencil: Planes through the cone's axis (purple).
These three pencils of surfaces are an orthogonal system of surfaces. The blue cones intersect the given cone C at a circle (red). The purple planes intersect at the lines of cone C (green).
(r,\varphi,\theta)
1. pencil: Cones with point S as apex and their axes are the axis of the given cone C (green):
(r,\varphi,\theta0)
(r0,\varphi,\theta)
(r,\varphi0,\theta)
1. pencil: Tori with the same directrix (green).
2. pencil: Cones containing the directrix circle of the torus with apexes on the axis of the torus (blue).
3. pencil: Planes containing the axis of the given torus (purple).
The blue cones intersect the torus at horizontal circles (red).The purple planes intersect at vertical circles (green).
The curvature lines of a torus generate a net of orthogonal circles. A torus contains more circles: the Villarceau circles, which are not curvature lines.
Usually a surface of revolution is determined by a generating plane curve (meridian)
m0
m0
1. pencil: Parallel surfaces to the given surface of revolution.
2. pencil: Cones with apices on the axis of revolution with generators orthogonal to the given surface (blue).
3. pencil: Planes containing the axis of revolution (purple).
The cones intersect the surface of revolution at circles (red). The purple planes intersect at meridians (green). Hence:
The article confocal conic sections deals with confocal quadrics, too. They are a prominent example of a non trivial orthogonal system of surfaces. Dupin's theorem shows that
the curvature lines of any of the quadrics can be seen as the intersection curves with quadrics out of the other pencils (see diagrams).
Confocal quadrics are never rotational quadrics, so the result on surfaces of revolution (above) cannot be applied. The curvature lines are i.g. curves of degree 4. (Curvature lines of rotational quadrics are always conic sections !)
a=1, b=0.8, c=0.6
a=0.67, b=0.3, c=0.44
A Dupin cyclide and its parallels are determined by a pair of focal conic sections. The diagram shows a ring cyclide together with its focal conic sections (ellipse: dark red, hyperbola: dark blue). The cyclide can be seen as a member of an orthogonal system of surfaces:
1. pencil: parallel surfaces of the cyclide.
2. pencil: right circular cones through the ellipse (their apexes are on the hyperbola)
3. pencil: right circular cones through the hyperbola (their apexes are on the ellipse)
The special feature of a cyclide is the property:
The curvature lines of a Dupin cyclide are circles.
Any point of consideration is contained in exactly one surface of any pencil of the orthogonal system. The three parameters
u,v,w
x=x(u,v,w)
y=y(u,v,w)
z=z(u,v,w)
\vecx=\vecx(u,v,w) .
For the example (cylinder) in the lead the new coordinates are the radius
r
\varphi
\zeta
r,\varphi,\zeta
The condition "the surfaces intersect orthogonally" at point
\vecx(u,v,w)
\vecxu x \vecxv, \vecxv x \vecxw, \vecxw x \vecxu
\vecxu, \vecxv, \vecxw
Hence
(1)
\vecxu ⋅ \vecxv=0, \vecxv ⋅ \vecxw=0, \vecxw ⋅ \vecxu=0 .
Deriving these equations for the variable, which is not contained in the equation, one gets
\vecxuw ⋅ \vecxv+\vecxu ⋅ \vecxvw=0 ,
\vecxuv ⋅ \vecxw+\vecxv ⋅ \vecxuw=0 ,
\vecxvw ⋅ \vecxu+\vecxw ⋅ \vecxvw=0 .
(2)
\vecxuv ⋅ \vecxw=0, \vecxvw ⋅ \vecxu=0, \vecxuw ⋅ \vecxv=0 .
From (1) and (2): The three vectors
\vecxu,\vecxv,\vecxuv
\vecxw
(3)
\det(\vecxuv,\vecxu,\vecxv)=0 .
From equation (1) one gets
F=0
M=0
\vecx=\vecx(u,v,w0)
Consequence: The parameter curves are curvature lines.
The analogous result for the other two surfaces through point
\vecx(u0,v0,w0)