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Szemerédi regularity lemma

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regularity partition
The edges between parts behave in a "random-like" fashion.

Szemerédi's regularity lemma is one of the most powerful tools in extremal graph theory, particularly in the study of large dense graphs. It states that the vertices of every large enough graph can be partitioned into a bounded number of parts so that the edges between different parts behave almost randomly.

According to the lemma, no matter how large a graph is, we can approximate it with the edge densities between a bounded number of parts. Between any two parts, the distribution of edges will be pseudorandom as per the edge density. These approximations provide essentially correct values for various properties of the graph, such as the number of embedded copies of a given subgraph or the number of edge deletions required to remove all copies of some subgraph.

Statement

To state Szemerédi's regularity lemma formally, we must formalize what the edge distribution between parts behaving 'almost randomly' really means. By 'almost random', we're referring to a notion called ε-regularity. To understand what this means, we first state some definitions. In what follows G is a graph with vertex set V.

Definition 1. Let XY be disjoint subsets of V. The edge density of the pair (XY) is defined as:

where E(XY) denotes the set of edges having one end vertex in X and one in Y.

regular pair
Subset pairs of a regular pair are similar in edge density to the original pair.

We call a pair of parts ε-regular if, whenever you take a large subset of each part, their edge density isn't too far off the edge density of the pair of parts. Formally,

Definition 2. For ε > 0, a pair of vertex sets X and Y is called ε-regular, if for all subsets A ⊆ X, B ⊆ Y satisfying |A| ≥ ε|X|, |B| ≥ ε|Y|, we have

The natural way to define an ε-regular partition should be one where each pair of parts is ε-regular. However, some graphs, such as the half graphs, require many pairs of partitions (but a small fraction of all pairs) to be irregular.[1] So we shall define ε-regular partitions to be one where most pairs of parts are ε-regular.

Definition 3. A partition of into sets is called an -regular partition if

Now we can state the lemma:

Szemerédi's Regularity Lemma. For every ε > 0 and positive integer m there exists an integer M such that if G is a graph with at least M vertices, there exists an integer k in the range m ≤ k ≤ M and an ε-regular partition of the vertex set of G into k sets.

The bound M for the number of parts in the partition of the graph given by the proofs of Szemeredi's regularity lemma is very large, given by a O(ε−5)-level iterated exponential of m. At one time it was hoped that the true bound was much smaller, which would have had several useful applications. However Gowers (1997) found examples of graphs for which M does indeed grow very fast and is at least as large as a ε−1/16-level iterated exponential of m. In particular the best bound has level exactly 4 in the Grzegorczyk hierarchy, and so is not an elementary recursive function.[2]

Proof

refinement
The boundaries of irregularity witnessing subsets refine each part of the partition.

We shall find an ε-regular partition for a given graph following an algorithm. A rough outline:

  1. Start with an arbitrary partition (could just be 1 part)
  2. While the partition isn't ε-regular:
    • Find the subsets which witness ε-irregularity for each irregular pair.
    • Simultaneously refine the partition using all the witnessing subsets.

We apply a technique called the energy increment argument to show that this process terminates after a bounded number of steps. Basically, we define a monovariant which must increase by a certain amount in each step, but it's bounded above and thus cannot increase indefinitely. This monovariant is called 'energy' as it's an quantity.

Definition 4. Let UW be subsets of V. Set . The energy of the pair (UW) is defined as:

For partitions of U and of W, we define the energy to be the sum of the energies between each pair of parts:

Finally, for a partition of V, define the energy of to be . Specifically,

Observe that energy is between 0 and 1 because edge density is bounded above by 1:

Now, we start by proving that energy does not decrease upon refinement.

Lemma 1. (Energy is nondecreasing under partitioning) For any partitions and of vertex sets and , .

Proof: Let and . Choose vertices uniformly from and uniformly from , with in part and in part . Then define the random variable . Let us look at properties of . The expectation is

The second moment is

By convexity, . Rearranging, we get that for all .

If each part of is further partitioned, the new partition is called a refinement of . Now, if , applying Lemma 1 to each pair proves that for every refinement of , . Thus the refinement step in the algorithm doesn't lose any energy.

Lemma 2. (Energy boost lemma) If is not -regular as witnessed by , then,

Proof: Define as above. Then,

But observe that with probability (corresponding to and ), so

Now we can prove the energy increment argument, which shows that energy increases substantially in each iteration of the algorithm.

Lemma 3 (Energy increment lemma) If a partition of is not -regular, then there exists a refinement of where every is partitioned into at most parts such that

Proof: For all such that is not -regular, find and that witness irregularity (do this simultaneously for all irregular pairs). Let be a common refinement of by 's. Each is partitioned into at most parts as desired. Then,

Where is the partition of given by . By Lemma 1, the above quantity is at least

Since is cut by when creating , so is a refinement of . By lemma 2, the above sum is at least

But the second sum is at least since is not -regular, so we deduce the desired inequality.

Now, starting from any partition, we can keep applying Lemma 3 as long as the resulting partition isn't -regular. But in each step energy increases by , and it's bounded above by 1. Then this process can be repeated at most times, before it terminates and we must have an -regular partition.

Applications

Graph counting lemma

If we have enough information about the regularity of a graph, we can count the number of copies of a specific subgraph within the graph up to small error.

Graph Counting Lemma. Let be a graph with , and let . Let be an -vertex graph with vertex sets such that is -regular whenever . Then, the number of labeled copies of in is within of

This can be combined with Szemerédi's regularity lemma to prove the Graph removal lemma. The graph removal lemma can be used to prove Roth's Theorem on Arithmetic Progressions,[3] and a generalization of it, the hypergraph removal lemma, can be used to prove Szemerédi's theorem.[4]

The graph removal lemma generalizes to induced subgraphs, by considering edge edits instead of only edge deletions. This was proved by Alon, Fischer, Krivelevich, and Szegedy in 2000.[5] However, this required a stronger variation of the regularity lemma.

Szemerédi's regularity lemma does not provide meaningful results in sparse graphs. Since sparse graphs have subconstant edge densities, -regularity is trivially satisfied. Even though the result seems purely theoretical, some attempts [6][7] have been made to use the regularity method as compression technique for large graphs.

Frieze-Kannan regularity

A different notion of regularity was introduced by Frieze and Kannan, known as the weak regularity lemma.[8] This lemma defines a weaker notion of regularity than that of Szemerédi which uses better bounds and can be used in efficient algorithms.

Given a graph , a partition of its vertices is said to be Frieze-Kannan -regular if for any pair of sets :

The weak regularity lemma for graphs states that every graph has a weak -regular partition into at most parts.

This notion can be extended to graphons by defining a stepping operator. Given a graphon and a partition of , we can define as a step-graphon with steps given by and values given by averaging over each step.

A partition is weak -regular if:

The weak regularity lemma for graphons states that every graphon has a weak -regular partition into at most parts. As with Szemerédi's regularity lemma, the weak regularity also induces a counting lemma.


Algorithmic Applications

One of the initial motivations for the development of the weak regularity lemma was the search for an efficient algorithm for estimating the maximum cut in a dense graph.[8] It has been shown that approximating the max-cut problem beyond 16/17 is NP-hard,[9] however an algorithmic version of the weak regularity lemma gives an efficient algorithm for approximating the max-cut for dense graphs within an additive error.[8] These ideas have been further developed into efficient sampling algorithms for estimating max-cut in dense graphs.[10]

The smaller bounds of the weak regularity lemma allow for efficient algorithms to find an -regular partition.[11] Graph regularity has further been used in various area of theoretical computer science, such as matrix multiplication[12] and communication complexity.[13]

Strong regularity lemma

The strong regularity lemma is a stronger variation of the regularity lemma proven by Alon, Fischer, Krivelevich, and Szegedy in 2000.[5] Intuitively, it provides information between non-regular pairs and could be applied to prove the induced graph removal lemma.

Statement

For any infinite sequence of constants , there exists an integer such that for any graph , we can obtain two (equitable) partitions and such that the following properties are satisfied:

  • refines , that is every part of is the union of some collection of parts in .
  • is -regular and is -regular.

Proof

We apply the regularity lemma repeatedly to prove the stronger version. A rough outline:

  • Start with be an regular partition
  • Repeatedly find its refinement that is regular. If the energy increment of , we simply return . Otherwise, we replace with and continue.

We start with be an regular partition of with parts. Here corresponds to the bound of parts in regularity lemma when .

Now for , we set to be an regular refinement of with parts. By the energy increment argument, . Since the energy is bounded in , there must be some such that . We return as .

By our choice of the regular and refinement conditions hold. The energy condition holds trivially. Now we argue for the number of parts. We use induction to show that , there exists such that . By setting , we have . Note that when , , so we could set and the statement is true for . By setting , we have

Remarks on equitable

A partition is equitable if the sizes of any two sets differ by at most . By equitizing in each round of iteration, the proof of regularity lemma could be accustomed to prove the equitable version of regularity lemma. And by replacing the regularity lemma with its equitable version, the proof above could prove the equitable version of strong regularity lemma where and are equitable partitions.

A useful Corollary

Statement

For any infinite sequence of constants , there exists such that there exists a partition and subsets for each where the following properties are satisfied:

  • is -regular for each pair
  • for all but pairs

Motivation

The corollary explores deeper the small energy increment. It gives us a partition together with subsets with large sizes from each part, which are pairwise regular. In addition, the density between the corresponding subset pairs differs "not much" from the density between the corresponding parts.

Proof of corollary

We'll only prove the weaker result where the second condition only requires to be -regular for . The full version can be proved by picking more subsets from each part that are mostly pairwise regular and combine them together.

Let . We apply the strong regularity lemma to find equitable that is a regular partition and equitable that is a regular refinement of , such that and .

Now assume that , we randomly pick a vertex from each and let to be the set that contains in . We argue that the subsets satisfy all the conditions with probability .

By setting the first condition is trivially true since is an equitable partition. Since at most vertex pairs live between irregular pairs in , the probability that the pair and is irregular , by union bound, the probability that at least one pair , is irregular . Note that

So by Markov's inequality , so with probability , at most pairs could have . By union bound, the probability that all conditions hold .

History and Extensions

Gowers's construction for the lower bound of Szemerédi's regularity lemma

Szemerédi (1975) first introduced a weaker version of this lemma, restricted to bipartite graphs, in order to prove Szemerédi's theorem,[14] and in (Szemerédi 1978) he proved the full lemma.[15] Extensions of the regularity method to hypergraphs were obtained by Rödl and his collaborators[16][17][18] and Gowers.[19][20]

János Komlós, Gábor Sárközy and Endre Szemerédi later (in 1997) proved in the blow-up lemma[21][22] that the regular pairs in Szemerédi regularity lemma behave like complete bipartite graphs under the correct conditions. The lemma allowed for deeper exploration into the nature of embeddings of large sparse graphs into dense graphs.

The first constructive version was provided by Alon, Duke, Lefmann, Rödl and Yuster.[23] Subsequently, Frieze and Kannan gave a different version and extended it to hypergraphs.[24] They later produced a different construction due to Alan Frieze and Ravi Kannan that uses singular values of matrices.[25] One can find more efficient non-deterministic algorithms, as formally detailed in Terence Tao's blog[26] and implicitly mentioned in various papers.[27][28][29]

An inequality of Terence Tao extends the Szemerédi regularity lemma, by revisiting it from the perspective of probability theory and information theory instead of graph theory.[30] Terence Tao has also provided a proof of the lemma based on spectral theory, using the adjacency matrices of graphs.[31]

It is not possible to prove a variant of the regularity lemma in which all pairs of partition sets are regular. Some graphs, such as the half graphs, require many pairs of partitions (but a small fraction of all pairs) to be irregular.[1]

It is a common variant in the definition of an -regular partition to require that the vertex sets all have the same size, while collecting the leftover vertices in an "error"-set whose size is at most an -fraction of the size of the vertex set of .

A stronger variation of the regularity lemma was proven by Alon, Fischer, Krivelevich, and Szegedy while proving the induced graph removal lemma. This works with a sequence of instead of just one, and shows that there exists a partition with an extremely regular refinement, where the refinement doesn't have too large of an energy increment.

Szemerédi's regularity lemma can be interpreted as saying that the space of all graphs is totally bounded (and hence precompact) in a suitable metric (the cut distance). Limits in this metric can be represented by graphons; another version of the regularity lemma simply states that the space of graphons is compact.[32]

References

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  26. ^ Tao, Terence (2009), Szemeredi's regularity lemma via random partitions
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Further reading