Expander graph

In combinatorics, an expander graph is a sparse graph that has strong connectivity properties, quantified using vertex, edge or spectral expansion. Expander constructions have spawned research in pure and applied mathematics, with several applications to complexity theory, design of robust computer networks, and the theory of error-correcting codes.[1]

Definitions

Intuitively, an expander graph is a finite, undirected multigraph in which every subset of the vertices that is not "too large" has a "large" boundary. Different formalisations of these notions give rise to different notions of expanders: edge expanders, vertex expanders, and spectral expanders, as defined below.

A disconnected graph is not an expander, since the boundary of a connected component is empty. Every connected graph is an expander; however, different connected graphs have different expansion parameters. The complete graph has the best expansion property, but it has largest possible degree. Informally, a graph is a good expander if it has low degree and high expansion parameters.

Edge expansion

The edge expansion (also isoperimetric number or Cheeger constant) h(G) of a graph G on n vertices is defined as

where

In the equation, the minimum is over all nonempty sets S of at most n/2 vertices and ∂S is the edge boundary of S, i.e., the set of edges with exactly one endpoint in S.[2]

Vertex expansion

The vertex isoperimetric number (also vertex expansion or magnification) of a graph G is defined as

where is the outer boundary of S, i.e., the set of vertices in with at least one neighbor in S.[3] In a variant of this definition (called unique neighbor expansion) is replaced by the set of vertices in V with exactly one neighbor in S.[4]

The vertex isoperimetric number of a graph G is defined as

where is the inner boundary of S, i.e., the set of vertices in S with at least one neighbor in .[3]

Spectral expansion

When G is d-regular, a linear algebraic definition of expansion is possible based on the eigenvalues of the adjacency matrix A = A(G) of G, where is the number of edges between vertices i and j.[5] Because A is symmetric, the spectral theorem implies that A has n real-valued eigenvalues . It is known that all these eigenvalues are in [−d, d].

Because G is regular, the uniform distribution with for all i = 1, ..., n is the stationary distribution of G. That is, we have Au = du, and u is an eigenvector of A with eigenvalue λ1 = d, where d is the degree of the vertices of G. The spectral gap of G is defined to be d  λ2, and it measures the spectral expansion of the graph G.[6]

It is known that λn = −d if and only if G is bipartite. In many contexts, for example in the expander mixing lemma, a bound on λ2 is not enough, but indeed it is necessary to bound the absolute value of all the eigenvalues away from d:

Since this is the largest eigenvalue corresponding to an eigenvector orthogonal to u, it can be equivalently defined using the Rayleigh quotient:

where

is the 2-norm of the vector .

The normalized versions of these definitions are also widely used and more convenient in stating some results. Here one considers the matrix , which is the Markov transition matrix of the graph G. Its eigenvalues are between −1 and 1. For not necessarily regular graphs, the spectrum of a graph can be defined similarly using the eigenvalues of the Laplacian matrix. For directed graphs, one considers the singular values of the adjacency matrix A, which are equal to the roots of the eigenvalues of the symmetric matrix ATA.

Relationships between different expansion properties

The expansion parameters defined above are related to each other. In particular, for any d-regular graph G,

Consequently, for constant degree graphs, vertex and edge expansion are qualitatively the same.

Cheeger inequalities

When G is d-regular, there is a relationship between the isoperimetric constant h(G) and the gap d − λ2 in the spectrum of the adjacency operator of G. By standard spectral graph theory, the trivial eigenvalue of the adjacency operator of a d-regular graph is λ1=d and the first non-trivial eigenvalue is λ2. If G is connected, then λ2 < d. An inequality due to Dodziuk[7] and independently Alon and Milman[8] states that[9]

This inequality is closely related to the Cheeger bound for Markov chains and can be seen as a discrete version of Cheeger's inequality in Riemannian geometry.

Similar connections between vertex isoperimetric numbers and the spectral gap have also been studied:[10]

Asymptotically speaking, the quantities , , and are all bounded above by the spectral gap .

Constructions

There are three general strategies for constructing families of expander graphs.[11] The first strategy is algebraic and group-theoretic, the second strategy is analytic and uses additive combinatorics, and the third strategy is combinatorial and uses the zig-zag and related graph products. Noga Alon showed that certain graphs constructed from finite geometries are the sparsest examples of highly expanding graphs.[12]

Margulis–Gabber–Galil

Algebraic constructions based on Cayley graphs are known for various variants of expander graphs. The following construction is due to Margulis and has been analysed by Gabber and Galil.[13] For every natural number n, one considers the graph Gn with the vertex set , where : For every vertex , its eight adjacent vertices are

Then the following holds:

Theorem. For all n, the graph Gn has second-largest eigenvalue .

Ramanujan graphs

By a theorem of Alon and Boppana, all sufficiently large d-regular graphs satisfy , where is the second largest eigenvalue in absolute value.[14] Ramanujan graphs are d-regular graphs for which this bound is tight, satisfying .[15] Hence Ramanujan graphs have an asymptotically smallest possible value of . This makes them excellent spectral expanders.

Lubotzky, Phillips, and Sarnak (1988), Margulis (1988), and Morgenstern (1994) show how Ramanujan graphs can be constructed explicitly.[16] By a theorem of Friedman (2003), random d-regular graphs on n vertices are almost Ramanujan, that is, they satisfy

for every with probability as n tends to infinity.[17]

Applications and useful properties

The original motivation for expanders is to build economical robust networks (phone or computer): an expander with bounded valence is precisely an asymptotic robust graph with the number of edges growing linearly with size (number of vertices), for all subsets.

Expander graphs have found extensive applications in computer science, in designing algorithms, error correcting codes, extractors, pseudorandom generators, sorting networks (Ajtai, Komlós & Szemerédi (1983)) and robust computer networks. They have also been used in proofs of many important results in computational complexity theory, such as SL = L (Reingold (2008)) and the PCP theorem (Dinur (2007)). In cryptography, expander graphs are used to construct hash functions.

Expander mixing lemma

The expander mixing lemma states that, for any two subsets of the vertices S, TV, the number of edges between S and T is approximately what you would expect in a random d-regular graph. The approximation is better the smaller is. In a random d-regular graph, as well as in an Erdős–Rényi random graph with edge probability d/n, we expect edges between S and T.

More formally, let E(S, T) denote the number of edges between S and T. If the two sets are not disjoint, edges in their intersection are counted twice, that is,

Then the expander mixing lemma says that the following inequality holds:

Expander walk sampling

The Chernoff bound states that, when sampling many independent samples from a random variables in the range [−1, 1], with high probability the average of our samples is close to the expectation of the random variable. The expander walk sampling lemma, due to Ajtai, Komlós & Szemerédi (1987) and Gillman (1998), states that this also holds true when sampling from a walk on an expander graph. This is particularly useful in the theory of derandomization, since sampling according to an expander walk uses many fewer random bits than sampling independently.

See also

Notes

  1. Hoory, Linial & Wigderson (2006)
  2. Definition 2.1 in Hoory, Linial & Wigderson (2006)
  3. Bobkov, Houdré & Tetali (2000)
  4. Alon & Capalbo (2002)
  5. cf. Section 2.3 in Hoory, Linial & Wigderson (2006)
  6. This definition of the spectral gap is from Section 2.3 in Hoory, Linial & Wigderson (2006)
  7. Dodziuk 1984.
  8. Alon & Spencer 2011.
  9. Theorem 2.4 in Hoory, Linial & Wigderson (2006)
  10. See Theorem 1 and p.156, l.1 in Bobkov, Houdré & Tetali (2000). Note that λ2 there corresponds to 2(d  λ2) of the current article (see p.153, l.5)
  11. see, e.g., Yehudayoff (2012)
  12. Alon, Noga (1986). "Eigenvalues, geometric expanders, sorting in rounds, and ramsey theory". Combinatorica. 6 (3): 207–219. CiteSeerX 10.1.1.300.5945. doi:10.1007/BF02579382.
  13. see, e.g., p.9 of Goldreich (2011)
  14. Theorem 2.7 of Hoory, Linial & Wigderson (2006)
  15. Definition 5.11 of Hoory, Linial & Wigderson (2006)
  16. Theorem 5.12 of Hoory, Linial & Wigderson (2006)
  17. Theorem 7.10 of Hoory, Linial & Wigderson (2006)

References

Textbooks and surveys

Research articles

Recent Applications

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