An integrally convex set is the discrete geometry analogue of the concept of convex set in geometry.

A subset X of the integer grid is integrally convex if any point y in the convex hull of X can be expressed as a convex combination of the points of X that are "near" y, where "near" means that the distance between each two coordinates is less than 1.[1]

Definitions

Let X be a subset of .

Denote by ch(X) the convex hull of X. Note that ch(X) is a subset of , since it contains all the real points that are convex combinations of the integer points in X.

For any point y in , denote near(y)  := {z in | |zi - yi| < 1 for all i in {1,...,n} }. These are the integer points that are considered "nearby" to the real point y.

A subset X of is called integrally convex if every point y in ch(X) is also in ch(X ∩ near(y)).[2]

Example

Non-integrally convex set

Let n = 2 and let X = { (0,0), (1,0), (2,0), (2,1) }. Its convex hull ch(X) contains, for example, the point y = (1.2, 0.5).

The integer points nearby y are near(y) = {(1,0), (2,0), (1,1), (2,1) }. So X ∩ near(y) = {(1,0), (2,0), (2,1)}. But y is not in ch(X ∩ near(y)). See image at the right.

Therefore X is not integrally convex.[1]

In contrast, the set Y = { (0,0), (1,0), (2,0), (1,1), (2,1) } is integrally convex.

Properties

Iimura, Murota and Tamura[3] have shown the following property of integrally convex set.

Let be a finite integrally convex set. There exists a triangulation of ch(X) that is integral, i.e.:

  • The vertices of the triangulation are the vertices of X;
  • The vertices of every simplex of the triangulation lie in the same "cell" (hypercube of side-length 1) of the integer grid .
Integrally convex set

The example set X is not integrally convex, and indeed ch(X) does not admit an integral triangulation: every triangulation of ch(X), either has to add vertices not in X, or has to include simplices that are not contained in a single cell.

In contrast, the set Y = { (0,0), (1,0), (2,0), (1,1), (2,1) } is integrally convex, and indeed admits an integral triangulation, e.g. with the three simplices {(0,0),(1,0),(1,1)} and {(1,0),(2,0),(2,1)} and {(1,0),(1,1),(2,1)}. See image at the right.

References

  1. 1 2 Yang, Zaifu (2009-12-01). "Discrete fixed point analysis and its applications". Journal of Fixed Point Theory and Applications. 6 (2): 351–371. doi:10.1007/s11784-009-0130-9. ISSN 1661-7746. S2CID 122640338.
  2. Chen, Xi; Deng, Xiaotie (2006). "A Simplicial Approach for Discrete Fixed Point Theorems". In Chen, Danny Z.; Lee, D. T. (eds.). Computing and Combinatorics. Lecture Notes in Computer Science. Vol. 4112. Berlin, Heidelberg: Springer. pp. 3–12. doi:10.1007/11809678_3. ISBN 978-3-540-36926-4.
  3. Iimura, Takuya; Murota, Kazuo; Tamura, Akihisa (2005-12-01). "Discrete fixed point theorem reconsidered" (PDF). Journal of Mathematical Economics. 41 (8): 1030–1036. doi:10.1016/j.jmateco.2005.03.001. ISSN 0304-4068.
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