Jump to content

Graphon

From Wikipedia, the free encyclopedia
(Redirected from Continuous graph)
A realization of an exchangeable random graph defined by a graphon. The graphon is shown as a magenta heatmap (lower right). A random graph of size is generated by independently assigning to each vertex a latent random variable (values along vertical axis) and including each edge independently with probability . For example, edge (green, dotted) is present with probability ; the green boxes in the right square represent the values of and . The upper left panel shows the graph realization as an adjacency matrix.

In graph theory and statistics, a graphon (also known as a graph limit) is a symmetric measurable function , that is important in the study of dense graphs. Graphons arise both as a natural notion for the limit of a sequence of dense graphs, and as the fundamental defining objects of exchangeable random graph models. Graphons are tied to dense graphs by the following pair of observations: the random graph models defined by graphons give rise to dense graphs almost surely, and, by the regularity lemma, graphons capture the structure of arbitrary large dense graphs.

Statistical formulation

[edit]

A graphon is a symmetric measurable function . Usually a graphon is understood as defining an exchangeable random graph model according to the following scheme:

  1. Each vertex of the graph is assigned an independent random value
  2. Edge is independently included in the graph with probability .

A random graph model is an exchangeable random graph model if and only if it can be defined in terms of a (possibly random) graphon in this way. The model based on a fixed graphon is sometimes denoted , by analogy with the Erdős–Rényi model of random graphs. A graph generated from a graphon in this way is called a -random graph.

It follows from this definition and the law of large numbers that, if , exchangeable random graph models are dense almost surely.[1]

Examples

[edit]

The simplest example of a graphon is for some constant . In this case the associated exchangeable random graph model is the Erdős–Rényi model that includes each edge independently with probability .

If we instead start with a graphon that is piecewise constant by:

  1. dividing the unit square into blocks, and
  2. setting equal to on the block,

the resulting exchangeable random graph model is the community stochastic block model, a generalization of the Erdős–Rényi model. We can interpret this as a random graph model consisting of distinct Erdős–Rényi graphs with parameters respectively, with bigraphs between them where each possible edge between blocks and is included independently with probability .

Many other popular random graph models can be understood as exchangeable random graph models defined by some graphon, a detailed survey is included in Orbanz and Roy.[1]

Jointly exchangeable adjacency matrices

[edit]

A random graph of size can be represented as a random adjacency matrix. In order to impose consistency (in the sense of projectivity) between random graphs of different sizes it is natural to study the sequence of adjacency matrices arising as the upper-left sub-matrices of some infinite array of random variables; this allows us to generate by adding a node to and sampling the edges for . With this perspective, random graphs are defined as random infinite symmetric arrays .

Following the fundamental importance of exchangeable sequences in classical probability, it is natural to look for an analogous notion in the random graph setting. One such notion is given by jointly exchangeable matrices; i.e. random matrices satisfying

for all permutations of the natural numbers, where means equal in distribution. Intuitively, this condition means that the distribution of the random graph is unchanged by a relabeling of its vertices: that is, the labels of the vertices carry no information.

There is a representation theorem for jointly exchangeable random adjacency matrices, analogous to de Finetti’s representation theorem for exchangeable sequences. This is a special case of the Aldous–Hoover theorem for jointly exchangeable arrays and, in this setting, asserts that the random matrix is generated by:

  1. Sample independently
  2. independently at random with probability

where is a (possibly random) graphon. That is, a random graph model has a jointly exchangeable adjacency matrix if and only if it is a jointly exchangeable random graph model defined in terms of some graphon.

Graphon estimation

[edit]

Due to identifiability issues, it is impossible to estimate either the graphon function or the node latent positions and there are two main directions of graphon estimation. One direction aims at estimating up to an equivalence class,[2][3] or estimate the probability matrix induced by .[4][5]

Analytic formulation

[edit]

Any graph on vertices can be identified with its adjacency matrix . This matrix corresponds to a step function , defined by partitioning into intervals such that has interior and for each , setting equal to the entry of . This function is the associated graphon of the graph .

In general, if we have a sequence of graphs where the number of vertices of goes to infinity, we can analyze the limiting behavior of the sequence by considering the limiting behavior of the functions . If these graphs converge (according to some suitable definition of convergence), then we expect the limit of these graphs to correspond to the limit of these associated functions.

This motivates the definition of a graphon (short for "graph function") as a symmetric measurable function which captures the notion of a limit of a sequence of graphs. It turns out that for sequences of dense graphs, several apparently distinct notions of convergence are equivalent and under all of them the natural limit object is a graphon.[6]

Examples

[edit]

Constant graphon

[edit]

Take a sequence of Erdős–Rényi random graphs with some fixed parameter . Intuitively, as tends to infinity, the limit of this sequence of graphs is determined solely by edge density of these graphs. In the space of graphons, it turns out that such a sequence converges almost surely to the constant , which captures the above intuition.

Half graphon

[edit]

Take the sequence of half-graphs, defined by taking to be the bipartite graph on vertices and such that is adjacent to precisely when . If the vertices are listed in the presented order, then the adjacency matrix has two corners of "half square" block matrices filled with ones, with the rest of the entries equal to zero. For example, the adjacency matrix of is given by

As gets large, these corners of ones "smooth" out. Matching this intuition, the sequence converges to the half-graphon defined by when and otherwise.

Complete bipartite graphon

[edit]

Take the sequence of complete bipartite graphs with equal sized parts. If we order the vertices by placing all vertices in one part at the beginning and placing the vertices of the other part at the end, the adjacency matrix of looks like a block off-diagonal matrix, with two blocks of ones and two blocks of zeros. For example, the adjacency matrix of is given by

As gets larger, this block structure of the adjacency matrix remains constant, so that this sequence of graphs converges to a "complete bipartite" graphon defined by whenever and , and setting otherwise.

If we instead order the vertices of by alternating between parts, the adjacency matrix has a chessboard structure of zeros and ones. For example, under this ordering, the adjacency matrix of is given by

As gets larger, the adjacency matrices become a finer and finer chessboard. Despite this behavior, we still want the limit of to be unique and result in the graphon from example 3. This means that when we formally define convergence for a sequence of graphs, the definition of a limit should be agnostic to relabelings of the vertices.

Limit of W-random graphs

[edit]

Take a random sequence of -random graphs by drawing for some fixed graphon . Then just like in the first example from this section, it turns out that converges to almost surely.

Recovering graph parameters from graphons

[edit]

Given graph with associated graphon , we can recover graph theoretic properties and parameters of by integrating transformations of . For example, the edge density (i.e. average degree divided by number of vertices) of is given by the integral This is because is -valued, and each edge in corresponds to a region of area where equals .

Similar reasoning shows that the triangle density in is equal to

Notions of convergence

[edit]

There are many different ways to measure the distance between two graphs. If we are interested in metrics that "preserve" extremal properties of graphs, then we should restrict our attention to metrics that identify random graphs as similar. For example, if we randomly draw two graphs independently from an Erdős–Rényi model for some fixed , the distance between these two graphs under a "reasonable" metric should be close to zero with high probability for large .

Naively, given two graphs on the same vertex set, one might define their distance as the number of edges that must be added or removed to get from one graph to the other, i.e. their edit distance. However, the edit distance does not identify random graphs as similar; in fact, two graphs drawn independently from have an expected (normalized) edit distance of .

There are two natural metrics that behave well on dense random graphs in the sense that we want. The first is a sampling metric, which says that two graphs are close if their distributions of subgraphs are close. The second is an edge discrepancy metric, which says two graphs are close when their edge densities are close on all their corresponding subsets of vertices.

Miraculously, a sequence of graphs converges with respect to one metric precisely when it converges with respect to the other. Moreover, the limit objects under both metrics turn out to be graphons. The equivalence of these two notions of convergence mirrors how various notions of quasirandom graphs are equivalent.[7]

Homomorphism densities

[edit]

One way to measure the distance between two graphs and is to compare their relative subgraph counts. That is, for each graph we can compare the number of copies of in and in . If these numbers are close for every graph , then intuitively and are similar looking graphs. Rather than dealing directly with subgraphs, however, it turns out to be easier to work with graph homomorphisms. This is fine when dealing with large, dense graphs, since in this scenario the number of subgraphs and the number of graph homomorphisms from a fixed graph are asymptotically equal.

Given two graphs and , the homomorphism density of in is defined to be the number of graph homomorphisms from to . In other words, is the probability a randomly chosen map from the vertices of to the vertices of sends adjacent vertices in to adjacent vertices in .

Graphons offer a simple way to compute homomorphism densities. Indeed, given a graph with associated graphon and another , we have

where the integral is multidimensional, taken over the unit hypercube . This follows from the definition of an associated graphon, by considering when the above integrand is equal to . We can then extend the definition of homomorphism density to arbitrary graphons , by using the same integral and defining

for any graph .

Given this setup, we say a sequence of graphs is left-convergent if for every fixed graph , the sequence of homomorphism densities converges. Although not evident from the definition alone, if converges in this sense, then there always exists a graphon such that for every graph , we have simultaneously.

Cut distance

[edit]

Take two graphs and on the same vertex set. Because these graphs share the same vertices, one way to measure their distance is to restrict to subsets of the vertex set, and for each such pair subsets compare the number of edges from to in to the number of edges between and in . If these numbers are similar for every pair of subsets (relative to the total number of vertices), then that suggests and are similar graphs.

As a preliminary formalization of this notion of distance, for any pair of graphs and on the same vertex set of size , define the labeled cut distance between and to be

In other words, the labeled cut distance encodes the maximum discrepancy of the edge densities between and . We can generalize this concept to graphons by expressing the edge density in terms of the associated graphon , giving the equality

where are unions of intervals corresponding to the vertices in and . Note that this definition can still be used even when the graphs being compared do not share a vertex set. This motivates the following more general definition.

Definition 1. For any symmetric, measurable function , define the cut norm of to be the quantity

taken over all measurable subsets of the unit interval.[6]

This captures our earlier notion of labeled cut distance, as we have the equality .

This distance measure still has one major limitation: it can assign nonzero distance to two isomorphic graphs. To make sure isomorphic graphs have distance zero, we should compute the minimum cut norm over all possible "relabellings" of the vertices. This motivates the following definition of the cut distance.

Definition 2. For any pair of graphons and , define their cut distance to be

where is the composition of with the map , and the infimum is taken over all measure-preserving bijections from the unit interval to itself.[8]

The cut distance between two graphs is defined to be the cut distance between their associated graphons.

We now say that a sequence of graphs is convergent under the cut distance if it is a Cauchy sequence under the cut distance . Although not a direct consequence of the definition, if such a sequence of graphs is Cauchy, then it always converges to some graphon .

Equivalence of convergence

[edit]

As it turns out, for any sequence of graphs , left-convergence is equivalent to convergence under the cut distance, and furthermore, the limit graphon is the same. We can also consider convergence of graphons themselves using the same definitions, and the same equivalence is true. In fact, both notions of convergence are related more strongly through what are called counting lemmas.[6]

Counting Lemma. For any pair of graphons and , we have

for all graphs .

The name "counting lemma" comes from the bounds that this lemma gives on homomorphism densities , which are analogous to subgraph counts of graphs. This lemma is a generalization of the graph counting lemma that appears in the field of regularity partitions, and it immediately shows that convergence under the cut distance implies left-convergence.

Inverse Counting Lemma. For every real number , there exist a real number and a positive integer such that for any pair of graphons and with

for all graphs satisfying , we must have .

This lemma shows that left-convergence implies convergence under the cut distance.

The space of graphons

[edit]

We can make the cut-distance into a metric by taking the set of all graphons and identifying two graphons whenever . The resulting space of graphons is denoted , and together with forms a metric space.

This space turns out to be compact. Moreover, it contains the set of all finite graphs, represented by their associated graphons, as a dense subset. These observations show that the space of graphons is a completion of the space of graphs with respect to the cut distance. One immediate consequence of this is the following.

Corollary 1. For every real number , there is an integer such that for every graphon , there is a graph with at most vertices such that .

To see why, let be the set of graphs. Consider for each graph the open ball containing all graphons such that . The set of open balls for all graphs covers , so compactness implies that there is a finite subcover for some finite subset . We can now take to be the largest number of vertices among the graphs in .

Applications

[edit]

Regularity lemma

[edit]

Compactness of the space of graphons can be thought of as an analytic formulation of Szemerédi's regularity lemma; in fact, a stronger result than the original lemma.[9] Szemeredi's regularity lemma can be translated into the language of graphons as follows. Define a step function to be a graphon that is piecewise constant, i.e. for some partition of , is constant on for all . The statement that a graph has a regularity partition is equivalent to saying that its associated graphon is close to a step function.

The proof of compactness requires only the weak regularity lemma:

Weak Regularity Lemma for Graphons. For every graphon and , there is a step function with at most steps such that .

but it can be used to prove stronger regularity results, such as the strong regularity lemma:

Strong Regularity Lemma for Graphons. For every sequence of positive real numbers, there is a positive integer such that for every graphon , there is a graphon and a step function with steps such that and

The proof of the strong regularity lemma is similar in concept to Corollary 1 above. It turns out that every graphon can be approximated with a step function in the norm, showing that the set of balls cover . These sets are not open in the metric, but they can be enlarged slightly to be open. Now, we can take a finite subcover, and one can show that the desired condition follows.

Sidorenko's conjecture

[edit]

The analytic nature of graphons allows greater flexibility in attacking inequalities related to homomorphisms.

For example, Sidorenko's conjecture is a major open problem in extremal graph theory, which asserts that for any graph on vertices with average degree (for some ) and bipartite graph on vertices and edges, the number of homomorphisms from to is at least .[10] Since this quantity is the expected number of labeled subgraphs of in a random graph , the conjecture can be interpreted as the claim that for any bipartite graph , the random graph achieves (in expectation) the minimum number of copies of over all graphs with some fixed edge density.

Many approaches to Sidorenko's conjecture formulate the problem as an integral inequality on graphons, which then allows the problem to be attacked using other analytical approaches. [11]

Generalizations

[edit]

Graphons are naturally associated with dense simple graphs. There are extensions of this model to dense directed weighted graphs, often referred to as decorated graphons.[12] There are also recent extensions to the sparse graph regime, from both the perspective of random graph models [13] and graph limit theory.[14][15]

References

[edit]
  1. ^ a b Orbanz, P.; Roy, D.M. (2015). "Bayesian Models of Graphs, Arrays and Other Exchangeable Random Structures". IEEE Transactions on Pattern Analysis and Machine Intelligence. 37 (2): 437–461. arXiv:1312.7857. doi:10.1109/tpami.2014.2334607. PMID 26353253. S2CID 566759.
  2. ^ Wolfe, Patrick J.; Olhede, Sofia C. (2013-09-23). "Nonparametric graphon estimation". arXiv:1309.5936 [math.ST].
  3. ^ Choi, David; Wolfe, Patrick J. (February 2014). "Co-clustering separately exchangeable network data". The Annals of Statistics. 42 (1): 29–63. arXiv:1212.4093. doi:10.1214/13-AOS1173. ISSN 0090-5364. S2CID 16291079.
  4. ^ Gao, Chao; Lu, Yu; Zhou, Harrison H. (December 2015). "Rate-optimal graphon estimation". The Annals of Statistics. 43 (6): 2624–2652. arXiv:1410.5837. doi:10.1214/15-AOS1354. ISSN 0090-5364. S2CID 14267617.
  5. ^ Yuan, Zhang; Elizaveta, Levina; Ji, Zhu (2017). "Estimating network edge probabilities by neighbourhood smoothing". Biometrika. 104 (4): 771–783. doi:10.1093/biomet/asx042. ISSN 0006-3444.
  6. ^ a b c Lovász, L. Large Networks and Graph Limits. American Mathematical Society.
  7. ^ Chung, Fan R. K.; Graham, Ronald L.; Wilson, R. M. (1989). "Quasi-random graphs". Combinatorica. 9 (4): 345–362. doi:10.1007/BF02125347.
  8. ^ Glasscock, D. (2015). "What is a graphon". Notices of the American Mathematical Society. 62 (1): 46–48. arXiv:1611.00718.
  9. ^ Lovász, László; Szegedy, Balázs (2007). "Szemerédi's lemma for the analyst". Geometric and Functional Analysis. 17: 252–270. doi:10.1007/s00039-007-0599-6. S2CID 15201345.
  10. ^ Sidorenko, A. (1993). "A correlation inequality for bipartite graphs". Graphs and Combinatorics. 9 (2–4): 201–204. doi:10.1007/BF02988307.
  11. ^ Hatami, H. (2010). "Graph norms and Sidorenko's conjecture". Israel Journal of Mathematics. 175 (1): 125–150. arXiv:0806.0047. doi:10.1007/s11856-010-0005-1.
  12. ^ Haupt, Andreas; Schultz, Thomas; Khatami, Mohammed; Tran, Ngoc (July 17, 2020). "Classification on Large Networks: A Quantitative Bound via Motifs and Graphons (Research)". In Acu, Bahar; Danialli, Donatella; Lewicka, Marta; Pati, Arati; RV, Saraswathy; Teboh-Ewungkem, Miranda (eds.). Advances in Mathematical Sciences. Association for Women in Mathematics Series. Vol. 21. Springer, Cham. pp. 107–126. arXiv:1710.08878. doi:10.1007/978-3-030-42687-3_7. ISBN 978-3-030-42687-3.
  13. ^ Veitch, V.; Roy, D. M. (2015). "The Class of Random Graphs Arising from Exchangeable Random Measures". arXiv:1512.03099 [math.ST].
  14. ^ Borgs, C.; Chayes, J. T.; Cohn, H.; Zhao, Y. (2019). "An Lp theory of sparse graph convergence I: limits, sparse random graph models, and power law distributions". Transactions of the American Mathematical Society. 372 (5): 3019–3062. arXiv:1401.2906. doi:10.1090/tran/7543. S2CID 50704206.
  15. ^ Borgs, C.; Chayes, J. T.; Cohn, H.; Zhao, Y. (2018). "An Lp theory of sparse graph convergence II: LD convergence, quotients, and right convergence". The Annals of Probability. 46 (2018): 337–396. arXiv:1408.0744. doi:10.1214/17-AOP1187. S2CID 51786393.