Hypergraph

An example of a hypergraph, with $X = \{v_1, v_2, v_3, v_4, v_5, v_6, v_7\}$ and $E = \{e_1,e_2,e_3,e_4\} =$ $\{\{v_1, v_2, v_3\},$ $\{v_2,v_3\},$ $\{v_3,v_5,v_6\},$ $\{v_4\}\}$ .

In mathematics, a hypergraph is a generalization of a graph in which an edge can connect any number of vertices. Formally, a hypergraph $H$ is a pair $H = (X,E)$ where $X$ is a set of elements called nodes or vertices, and $E$ is a set of non-empty subsets of $X$ called hyperedges or edges. Therefore, $E$ is a subset of $\mathcal{P}(X) \setminus\{\emptyset\}$ , where $\mathcal{P}(X)$ is the power set of $X$ .

While graph edges are pairs of nodes, hyperedges are arbitrary sets of nodes, and can therefore contain an arbitrary number of nodes. However, it is often desirable to study hypergraphs where all hyperedges have the same cardinality; a k-uniform hypergraph is a hypergraph such that all its hyperedges have size k. (In other words, it is a collection of sets of size k.) So a 2-uniform hypergraph is a graph, a 3-uniform hypergraph is a collection of unordered triples, and so on.

A hypergraph is also called a set system or a family of sets drawn from the universal set X. The difference between a set system and a hypergraph (which is not well defined) is in the questions being asked. Hypergraph theory tends to concern questions similar to those of graph theory, such as connectivity and colorability, while the theory of set systems tends to ask non-graph-theoretical questions, such as those of Sperner theory.

There are variant definitions; sometimes edges must not be empty, and sometimes multiple edges, with the same set of nodes, are allowed.

Hypergraphs can be viewed as incidence structures. In particular, there is a bipartite "incidence graph" or "Levi graph" corresponding to every hypergraph, and conversely, most, but not all, bipartite graphs can be regarded as incidence graphs of hypergraphs.

Hypergraphs have many other names. In computational geometry, a hypergraph may sometimes be called a range space and then the hyperedges are called ranges.^[1] In cooperative game theory, hypergraphs are called simple games (voting games); this notion is applied to solve problems in social choice theory. In some literature edges are referred to as hyperlinks or connectors.^[2]

Special kinds of hypergraphs include, besides k-uniform ones, clutters, where no edge appears as a subset of another edge; and abstract simplicial complexes, which contain all subsets of every edge.

The collection of hypergraphs is a category with hypergraph homomorphisms as morphisms.

1 Terminology
2 Bipartite graph model
3 Isomorphism and equality
- 3.1 Examples
4 Symmetric hypergraphs
5 Transversals
6 Incidence matrix
7 Hypergraph coloring
8 Partitions
9 Theorems
10 Hypergraph drawing
11 Generalizations
12 See also
13 Notes
14 References

Terminology

Because hypergraph links can have any cardinality, there are several notions of the concept of a subgraph, called subhypergraphs, partial hypergraphs and section hypergraphs.

Let $H=(X,E)$ be the hypergraph consisting of vertices

$X = \lbrace x_i | i \in I_v \rbrace,$

and having edge set

$E = \lbrace e_i | i\in I_e, e_i \subseteq X \rbrace,$

where $I_v$ and $I_e$ are the index sets of the vertices and edges respectively.

A subhypergraph is a hypergraph with some vertices removed. Formally, the subhypergraph $H_A$ induced by a subset $A$ of $X$ is defined as

$H_A=\left(A, \lbrace e_i \cap A |e_i \cap A \neq \varnothing \rbrace \right).$

The partial hypergraph is a hypergraph with some edges removed. Given a subset $J \subset I_e$ of the edge index set, the partial hypergraph generated by $J$ is the hypergraph

$\left(X, \lbrace e_i | i\in J \rbrace \right).$

Given a subset $A\subseteq X$ , the section hypergraph is the partial hypergraph

$H \times A = \left(A, \lbrace e_i | i\in I_e, e_i \subseteq A \rbrace \right).$

The dual $H^*$ of $H$ is a hypergraph whose vertices and edges are interchanged, so that the vertices are given by $\lbrace e_i \rbrace$ and whose edges are given by $\lbrace X_m \rbrace$ where

$X_m = \lbrace e_i | x_m \in e_i \rbrace.$

When a notion of equality is properly defined, as done below, the operation of taking the dual of a hypergraph is an involution, i.e.,

$\left(H^*\right)^* = H.$

A connected graph G with the same vertex set as a connected hypergraph H is a host graph for H if every hyperedge of H induces a connected subgraph in G. For a disconnected hypergraph H, G is a host graph if there is a bijection between the connected components of G and of H, such that each connected component G' of G is a host of the corresponding H'.

A hypergraph is bipartite if and only if its vertices can be partitioned into two classes U and V in such a way that each hyperedge with cardinality at least 2 contains at least one vertex from both classes.

The primal graph of a hypergraph is the graph with the same vertices of the hypergraph, and edges between all pairs of vertices contained in the same hyperedge. The primal graph is sometimes also known as the Gaifman graph of the hypergraph.

Bipartite graph model

A hypergraph H may be represented by a bipartite graph BG as follows: the sets X and E are the partitions of BG, and (x₁, e₁) are connected with an edge if and only if vertex x₁ is contained in edge e₁ in H. Conversely, any bipartite graph with fixed parts and no unconnected nodes in the second part represents some hypergraph in the manner described above. This bipartite graph is also called incidence graph.

Isomorphism and equality

A hypergraph homomorphism is a map from the vertex set of one hypergraph to another such that each edge maps to one other edge.

A hypergraph $H=(X,E)$ is isomorphic to a hypergraph $G=(Y,F)$ , written as $H \simeq G$ if there exists a bijection

$\phi:X \to Y$

and a permutation $\pi$ of $I$ such that

$\phi(e_i) = f_{\pi(i)}$

The bijection $\phi$ is then called the isomorphism of the graphs. Note that

$H \simeq G$ if and only if $H^* \simeq G^*$ .

When the edges of a hypergraph are explicitly labeled, one has the additional notion of strong isomorphism. One says that $H$ is strongly isomorphic to $G$ if the permutation is the identity. One then writes $H \cong G$ . Note that all strongly isomorphic graphs are isomorphic, but not vice-versa.

When the vertices of a hypergraph are explicitly labeled, one has the notions of equivalence, and also of equality. One says that $H$ is equivalent to $G$ , and writes $H\equiv G$ if the isomorphism $\phi$ has

$\phi(x_n) = y_n$

and

$\phi(e_i) = f_{\pi(i)}$

Note that

$H\equiv G$ if and only if $H^* \cong G^*$

If, in addition, the permutation $\pi$ is the identity, one says that $H$ equals $G$ , and writes $H=G$ . Note that, with this definition of equality, graphs are self-dual:

$\left(H^*\right) ^* = H$

A hypergraph automorphism is an isomorphism from a vertex set into itself, that is a relabeling of vertices. The set of automorphisms of a hypergraph H (= (X, E)) is a group under composition, called the automorphism group of the hypergraph and written Aut(H).

Examples

Consider the hypergraph $H$ with edges

$H = \lbrace e_1 = \lbrace a,b \rbrace,e_2 = \lbrace b,c \rbrace,e_3 = \lbrace c,d \rbrace,e_4 = \lbrace d,a \rbrace,e_5 = \lbrace b,d \rbrace,e_6 = \lbrace a,c \rbrace\rbrace$

and

$G = \lbrace f_1 = \lbrace \alpha,\beta \rbrace,f_2 = \lbrace \beta,\gamma \rbrace,f_3 = \lbrace \gamma,\delta \rbrace,f_4 = \lbrace \delta,\alpha \rbrace,f_5 = \lbrace \alpha,\gamma \rbrace, f_6 = \lbrace \beta,\delta \rbrace\rbrace$

Then clearly $H$ and $G$ are isomorphic (with $\phi(a)=\alpha$ , etc.), but they are not strongly isomorphic. So, for example, in $H$ , vertex $a$ meets edges 1, 4 and 6, so that,

$e_1 \cap e_4 \cap e_6 = \lbrace a\rbrace$

In graph $G$ , there does not exist any vertex that meets edges 1, 4 and 6:

$f_1 \cap f_4 \cap f_6 = \varnothing$

In this example, $H$ and $G$ are equivalent, $H\equiv G$ , and the duals are strongly isomorphic: $H^*\cong G^*$ .

Symmetric hypergraphs

The rank $r(H)$ of a hypergraph $H$ is the maximum cardinality of any of the edges in the hypergraph. If all edges have the same cardinality k, the hypergraph is said to be uniform or k-uniform, or is called a k-hypergraph. A graph is just a 2-uniform hypergraph.

The degree d(v) of a vertex v is the number of edges that contain it. H is k-regular if every vertex has degree k.

The dual of a uniform hypergraph is regular and vice-versa.

Two vertices x and y of H are called symmetric if there exists an automorphism such that $\phi(x)=y$ . Two edges $e_i$ and $e_j$ are said to be symmetric if there exists an automorphism such that $\phi(e_i)=e_j$ .

A hypergraph is said to be vertex-transitive (or vertex-symmetric) if all of its vertices are symmetric. Similarly, a hypergraph is edge-transitive if all edges are symmetric. If a hypergraph is both edge- and vertex-symmetric, then the hypergraph is simply transitive.

Because of hypergraph duality, the study of edge-transitivity is identical to the study of vertex-transitivity.

Transversals

A transversal (or "hitting set") of a hypergraph H = (X, E) is a set $T\subseteq X$ that has nonempty intersection with every edge. A transversal T is called minimal if no proper subset of T is a transversal. The transversal hypergraph of H is the hypergraph (X, F) whose edge set F consists of all minimal transversals of H.

Computing the transversal hypergraph has applications in combinatorial optimization, in game theory, and in several fields of computer science such as machine learning, indexing of databases, the satisfiability problem, data mining, and computer program optimization.

Incidence matrix

Let $V = \{v_1, v_2, ~\ldots, ~ v_n\}$ and $E = \{e_1, e_2, ~ \ldots ~ e_m\}$ . Every hypergraph has an $n \times m$ incidence matrix $A = (a_{ij})$ where

$a_{ij} = \left\{ \begin{matrix} 1 & \mathrm{if} ~ v_i \in e_j \ 0 & \mathrm{otherwise}. \end{matrix} \right.$

The transpose $A^t$ of the incidence matrix defines a hypergraph $H^* = (V^*,\ E^*)$ called the dual of $H$ , where $V^*$ is an m-element set and $E^*$ is an n-element set of subsets of $V^*$ . For $v^*_j \in V^*$ and $e^*_i \in E^*, ~ v^*_j \in e^*_i$ if and only if $a_{ij} = 1$ .

Hypergraph coloring

Hypergraph coloring is defined as follows. Let $H=(V, E)$ be a hypergraph such that $\Vert V\Vert = n$ . Then $C=\{c_1, c_2, \ldots, c_n\}$ is a proper coloring of $H$ if and only if, for all $e \in E, \vert e\vert > 1,$ there exists $v_i, v_j \in e$ such that $c_i \neq c_j$ . In other words, there must be no monochromatic hyperedge with cardinality at least 2.

Hypergraphs for which there exists a coloring using up to k colors are referred to as k-colorable. The 2-colorable hypergraphs are exactly the bipartite ones.

Partitions

A partition theorem due to E. Dauber^[3] states that, for an edge-transitive hypergraph $H=(X,E)$ , there exists a partition

$(X_1, X_2,\cdots,X_K)$

of the vertex set $X$ such that the subhypergraph $H_{X_k}$ generated by $X_k$ is transitive for each $1\le k \le K$ , and such that

$\sum_{k=1}^K r\left(H_{X_k} \right) = r(H)$

where $r(H)$ is the rank of H.

As a corollary, an edge-transitive hypergraph that is not vertex-transitive is bicolorable.

Graph partitioning (and in particular, hypergraph partitioning) has many applications to IC design^[4] and parallel computing.^[5]^[6]^[7]

Theorems

Many theorems and concepts involving graphs also hold for hypergraphs. Ramsey's theorem and Line graph of a hypergraph are typical examples. Some methods for studying symmetries of graphs extend to hypergraphs.

Two prominent theorems are the Erdős–Ko–Rado theorem and the Kruskal–Katona theorem on uniform hypergraphs.

Hypergraph drawing

This circuit diagram can be interpreted as a drawing of a hypergraph in which four vertices (depicted as white rectangles and disks) are connected by three hyperedges drawn as trees.

Although hypergraphs are more difficult to draw on paper than graphs, several researchers have studied methods for the visualization of hypergraphs.

In one possible visual representation for hypergraphs, similar to the standard graph drawing style in which curves in the plane are used to depict graph edges, a hypergraph's vertices are depicted as points, disks, or boxes, and its hyperedges are depicted as trees that have the vertices as their leaves.^[8]^[9] If the vertices are represented as points, the hyperedges may also be shown as smooth curves that connect sets of points, or as simple closed curves that enclose sets of points.^[10]^[11]

An order-4 Venn diagram, which can be interpreted as a subdivision drawing of a hypergraph with 15 vertices (the 15 colored regions) and 4 hyperedges (the 4 ellipses).

In another style of hypergraph visualization, the subdivision model of hypergraph drawing,^[12] the plane is subdivided into regions, each of which represents a single vertex of the hypergraph. The hyperedges of the hypergraph are represented by contiguous subsets of these regions, which may be indicated by coloring, by drawing outlines around them, or both. An order-n Venn diagram, for instance, may be viewed as a subdivision drawing of a hypergraph with n hyperedges (the curves defining the diagram) and 2ⁿ − 1 vertices (represented by the regions into which these curves subdivide the plane). In contrast with the polynomial-time recognition of planar graphs, it is NP-complete to determine whether a hypergraph has a planar subdivision drawing,^[13] but the existence of a drawing of this type may be tested efficiently when the adjacency pattern of the regions is constrained to be a path, cycle, or tree.^[14]

Generalizations

One possible generalization of a hypergraph is to allow edges to point at other edges. There are two variations of this generalization. In one, the edges consist not only of a set of vertices, but may also contain subsets of vertices, ad infinitum. Set membership then provides an ordering, but the ordering is neither a partial order nor a preorder, since it is not transitive. The graph corresponding to the Levi graph of this generalization is a directed acyclic graph. Consider, for example, the generalized hypergraph whose vertex set is $V= \{a,b\}$ and whose edges are $e_1=\{a,b\}$ and $e_2=\{a,e_1\}$ . Then, although $b\in e_1$ and $e_1\in e_2$ , it is not true that $b\in e_2$ . However, the transitive closure of set membership for such hypergraphs does induce a partial order, and "flattens" the hypergraph into a partially ordered set.

Alternately, edges can be allowed to point at other edges, (irrespective of the requirement that the edges be ordered as directed, acyclic graphs). This allows graphs with edge-loops, which need not contain vertices at all. For example, consider the generalized hypergraph consisting of two edges $e_1$ and $e_2$ , and zero vertices, so that $e_1 = \{e_2\}$ and $e_2 = \{e_1\}$ . As this loop is infinitely recursive, sets that are the edges violate the axiom of foundation. In particular, there is no transitive closure of set membership for such hypergraphs. Although such structures may seem strange at first, they can be readily understood by noting that the equivalent generalization of their Levi graph is no longer bipartite, but is rather just some general directed graph.

The generalized incidence matrix for such hypergraphs is, by definition, a square matrix, of a rank equal to the total number of vertices plus edges. Thus, for the above example, the incidence matrix is simply

$\left[ \begin{matrix} 0 & 1 \ 1 & 0 \end{matrix} \right].$

Notes

^ Haussler, David; Welzl, Emo (1987), "ε-nets and simplex range queries", Discrete and Computational Geometry 2 (2): 127–151, doi:10.1007/BF02187876, MR 884223.
^ Judea Pearl, in HEURISTICS Intelligent Search Strategies for Computer Problem Solving, Addison Wesley (1984), p. 25.
^ E. Dauber, in Graph theory, ed. F. Harary, Addison Wesley, (1969) p. 172.
^ Karypis, G., Aggarwal, R., Kumar, V., and Shekhar, S. (March 1999), "Multilevel hypergraph partitioning: applications in VLSI domain", IEEE Transactions on Very Large Scale Integration (VLSI) Systems 7 (1): 69–79, doi:10.1109/92.748202, http://ieeexplore.ieee.org/xpls/abs_a ll.jsp?arnumber=748202.
^ Hendrickson, B., Kolda, T.G. (2000), "Graph partitioning models for parallel computing", Parallel Computing 26 (12): 1519–1545, doi:10.1016/S0167-8191(00)00048-X.
^ Catalyurek, U.V.; C. Aykanat (1995). "A Hypergraph Model for Mapping Repeated Sparse Matrix-Vector Product Computations onto Multicomputers". Proc. Internation Conference on Hi Performance Computing (HiPC'95).
^ Catalyurek, U.V.; C. Aykanat (1999), "Hypergraph-Partitioning Based Decomposition for Parallel Sparse-Matrix Vector Multiplication", IEEE Transactions on Parallel and Distributed Systems (IEEE) 10 (7): 673–693, doi:10.1109/71.780863, http://doi.ieeecomputersociety.org/10 .1109/71.780863.
^ Sander, G. (2003), "Layout of directed hypergraphs with orthogonal hyperedges", Proc. 11th International Symposium on Graph Drawing (GD 2003), Lecture Notes in Computer Science, 2912, Springer-Verlag, pp. 381–386, http://gdea.informatik.uni-koeln.de/5 85/1/hypergraph.ps.
^ Eschbach, Thomas; Günther, Wolfgang; Becker, Bernd (2006), "Orthogonal hypergraph drawing for improved visibility", Journal of Graph Algorithms and Applications 10 (2): 141–157, http://jgaa.info/accepted/2006/Eschba chGuentherBecker2006.10.2.pdf.
^ Mäkinen, Erkki (1990), "How to draw a hypergraph", International Journal of Computer Mathematics 34 (3): 177–185, doi:10.1080/00207169008803875.
^ Bertault, François; Eades, Peter (2001), "Drawing hypergraphs in the subset standard", Proc. 8th International Symposium on Graph Drawing (GD 2000), Lecture Notes in Computer Science, 1984, Springer-Verlag, pp. 45–76, doi:10.1007/3-540-44541-2_15.
^ Kaufmann, Michael; van Kreveld, Marc; Speckmann, Bettina (2009), "Subdivision drawings of hypergraphs", Proc. 16th International Symposium on Graph Drawing (GD 2008), Lecture Notes in Computer Science, 5417, Springer-Verlag, pp. 396–407, doi:10.1007/978-3-642-00219-9_39.
^ Johnson, David S.; Pollak, H. O. (2006), "Hypergraph planarity and the complexity of drawing Venn diagrams", Journal of graph theory 11 (3): 309–325, doi:10.1002/jgt.3190110306.
^ Buchin, Kevin; van Kreveld, Marc; Meijer, Henk; Speckmann, Bettina; Verbeek, Kevin (2010), "On planar supports for hypergraphs", Proc. 17th International Symposium on Graph Drawing (GD 2009), Lecture Notes in Computer Science, 5849, Springer-Verlag, pp. 345–356, doi:10.1007/978-3-642-11805-0_33.

References

Claude Berge, Dijen Ray-Chaudhuri, "Hypergraph Seminar, Ohio State University 1972", Lecture Notes in Mathematics 411 Springer-Verlag
Vitaly I. Voloshin. "Introduction to Graph and Hypergraph Theory". Nova Science Publishers, Inc., 2009.
This article incorporates material from hypergraph on PlanetMath, which is licensed under the Creative Commons Attribution/Share-Alike License.

Contents