Shelling (topology)

Template:Short descriptionIn mathematics, a shelling of a simplicial complex is a way of gluing it together from its maximal simplices (simplices that are not a face of another simplex) in a well-behaved way. A complex admitting a shelling is called shellable.

A d-dimensional simplicial complex is called pure if its maximal simplices all have dimension d. Let ${\displaystyle \mathrm{\Delta }}$ be a finite or countably infinite simplicial complex. An ordering ${\displaystyle C_1,C_2,\dots }$ of the maximal simplices of ${\displaystyle \mathrm{\Delta }}$ is a shelling if, for all ${\displaystyle k=2,3,\dots }$, the complex

${\displaystyle B_k:=\left({\displaystyle \bigcup _{i=1}^{k-1}}{C}_i\right)\cap C_k}$

is pure and of dimension one smaller than ${\displaystyle \dim C_k}$. That is, the "new" simplex ${\displaystyle C_k}$ meets the previous simplices along some union ${\displaystyle B_k}$ of top-dimensional simplices of the boundary of ${\displaystyle C_k}$. If ${\displaystyle B_k}$ is the entire boundary of ${\displaystyle C_k}$ then ${\displaystyle C_k}$ is called spanning.

For ${\displaystyle \mathrm{\Delta }}$ not necessarily countable, one can define a shelling as a well-ordering of the maximal simplices of ${\displaystyle \mathrm{\Delta }}$ having analogous properties.

• A shellable complex is homotopy equivalent to a wedge sum of spheres, one for each spanning simplex of corresponding dimension.
• A shellable complex may admit many different shellings, but the number of spanning simplices and their dimensions do not depend on the choice of shelling. This follows from the previous property.

• Every Coxeter complex, and more generally every building (in the sense of Tits), is shellable.^[1]

• The boundary complex of a (convex) polytope is shellable.^[2][3] Note that here, shellability is generalized to the case of polyhedral complexes (that are not necessarily simplicial).

• There is an unshellable triangulation of the tetrahedron.^[4]

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