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Link (simplicial complex)

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The tetrahedron is a 2-complex.

The link in a simplicial complex is a generalization of the neighborhood of a vertex in a graph. The link of a vertex encodes information about the local structure of the complex at the vertex.

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Given an abstract simplicial complex X and a vertex in , its link is a set containing every face such that and is a face of X.

  • In the special case in which X is a 1-dimensional complex (that is: a graph), contains all vertices such that is an edge in the graph; that is, the neighborhood of in the graph.

Given a geometric simplicial complex X and , its link is a set containing every face such that and there is a simplex in that has as a vertex and as a face.[1]: 3  Equivalently, the join is a face in .[2]: 20 

  • As an example, suppose v is the top vertex of the tetrahedron at the left. Then the link of v is the triangle at the base of the tetrahedron. This is because, for each edge of that triangle, the join of v with the edge is a triangle (one of the three triangles at the sides of the tetrahedron); and the join of v with the triangle itself is the entire tetrahedron.
    The link of a vertex of a tetrahedron is the triangle.

An alternative definition is: the link of a vertex is the graph Lk(v, X) constructed as follows. The vertices of Lk(v, X) are the edges of X incident to v. Two such edges are adjacent in Lk(v, X) iff they are incident to a common 2-cell at v.

  • The graph Lk(v, X) is often given the topology of a ball of small radius centred at v; it is an analog to a sphere centered at a point.[3]
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The definition of a link can be extended from a single vertex to any face.

Given an abstract simplicial complex X and any face of X, its link is a set containing every face such that are disjoint and is a face of X: .

Given a geometric simplicial complex X and any face , its link is a set containing every face such that are disjoint and there is a simplex in that has both and as faces.[1]: 3 

Examples

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The link of a vertex of a tetrahedron is a triangle – the three vertices of the link corresponds to the three edges incident to the vertex, and the three edges of the link correspond to the faces incident to the vertex. In this example, the link can be visualized by cutting off the vertex with a plane; formally, intersecting the tetrahedron with a plane near the vertex – the resulting cross-section is the link.

Another example is illustrated below. There is a two-dimensional simplicial complex. At the left, a vertex is marked in yellow. At the right, the link of that vertex is marked in green.

Properties

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  • For any simplicial complex X, every link is downward-closed, and therefore it is a simplicial complex too; it is a sub-complex of X.
  • Because X is simplicial, there is a set isomorphism between and the set : every corresponds to , which is in .
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A concept closely related to the link is the star.

Given an abstract simplicial complex X and any face ,, its star is a set containing every face such that is a face of X. In the special case in which X is a 1-dimensional complex (that is: a graph), contains all edges for all vertices that are neighbors of . That is, it is a graph-theoretic star centered at .

Given a geometric simplicial complex X and any face , its star is a set containing every face such that there is a simplex in having both and as faces: . In other words, it is the closure of the set -- the set of simplices having as a face.

So the link is a subset of the star. The star and link are related as follows:

  • For any , . [1]: 3 
  • For any , , that is, the star of is the cone of its link at .[2]: 20 

An example is illustrated below. There is a two-dimensional simplicial complex. At the left, a vertex is marked in yellow. At the right, the star of that vertex is marked in green.

See also

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  • Vertex figure - a geometric concept similar to the simplicial link.

References

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  1. ^ a b c Bryant, John L. (2001-01-01), Daverman, R. J.; Sher, R. B. (eds.), "Chapter 5 - Piecewise Linear Topology", Handbook of Geometric Topology, Amsterdam: North-Holland, pp. 219–259, ISBN 978-0-444-82432-5, retrieved 2022-11-15
  2. ^ a b Rourke, Colin P.; Sanderson, Brian J. (1972). Introduction to Piecewise-Linear Topology. doi:10.1007/978-3-642-81735-9. ISBN 978-3-540-11102-3.
  3. ^ Bridson, Martin; Haefliger, André (1999), Metric spaces of non-positive curvature, Springer, ISBN 3-540-64324-9