Schlegel Diagram

In geometry, a Schlegel diagram is a projection of a polytope from $\mathbb^d$ into $\mathbb^$ through a point just outside one of its facets. The resulting entity is a polytopal subdivision of the facet in $\mathbb^$ that, together with the original facet, is combinatorially equivalent to the original polytope. The diagram is named for Victor Schlegel, who in 1886 introduced this tool for studying combinatorial and topological properties of polytopes. In dimension 3, a Schlegel diagram is a projection of a polyhedron into a plane figure; in dimension 4, it is a projection of a 4-polytope to 3-space. As such, Schlegel diagrams are commonly used as a means of visualizing four-dimensional polytopes.

Construction

The most elementary Schlegel diagram, that of a polyhedron, was described by Duncan Sommerville as follows:
:A very useful method of representing a convex polyhedron is by plane projection. If it is projected from any external point, since each ray cuts it twice, it will be represented by a polygonal area divided twice over into polygons. It is always possible by suitable choice of the centre of projection to make the projection of one face completely contain the projections of all the other faces. This is called a ''Schlegel diagram'' of the polyhedron. The Schlegel diagram completely represents the morphology of the polyhedron. It is sometimes convenient to project the polyhedron from a vertex; this vertex is projected to infinity and does not appear in the diagram, the edges through it are represented by lines drawn outwards.
Sommerville also considers the case of a simplex in four dimensions:Sommerville (1929), p.101. "The Schlegel diagram of simplex in S₄ is a tetrahedron divided into four tetrahedra." More generally, a polytope in n-dimensions has a Schlegel diagram constructed by a perspective projection viewed from a point outside of the polytope, above the center of a facet. All vertices and edges of the polytope are projected onto a hyperplane of that facet. If the polytope is convex, a point near the facet will exist which maps the facet outside, and all other facets inside, so no edges need to cross in the projection.

Examples

See also

* Net (polyhedron) – A different approach for visualization by lowering the dimension of a polytope is to build a net, disconnecting facets, and ''unfolding'' until the facets can exist on a single hyperplane. This maintains the geometric scale and shape, but makes the topological connections harder to see.

References

Further reading

* Victor Schlegel (1883) ''Theorie der homogen zusammengesetzten Raumgebilde'', Nova Acta, Ksl. Leop.-Carol. Deutsche Akademie der Naturforscher, Band XLIV, Nr. 4, Druck von E. Blochmann & Sohn in Dresden

* Victor Schlegel (1886) ''Ueber Projectionsmodelle der regelmässigen vier-dimensionalen Körper'', Waren.
* Coxeter, Coxeter, H.S.M.; ''Regular Polytopes'', (Methuen and Co., 1948). (p. 242)
** ''Regular Polytopes'', (3rd edition, 1973), Dover edition,
* .

External links

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** {{mathworld , urlname = Skeleton , title = Skeleton

George W. Hart: 4D Polytope Projection Models by 3D Printing

Nrich maths – for the teenager. Also useful for teachers.

Polytopes
Projective geometry