Discrepancy of hypergraphs

Discrepancy of hypergraphs is an area of discrepancy theory.

Hypergraph discrepancies in two colors

In the classical setting, we aim at partitioning the vertices of a hypergraph into two classes in such a way that ideally each hyperedge contains the same number of vertices in both classes. A partition into two classes can be represented by a coloring . We call -1 and +1 colors. The color-classes and form the corresponding partition. For a hyperedge , set

The discrepancy of with respect to and the discrepancy of are defined by

These notions as well as the term 'discrepancy' seem to have appeared for the first time in a paper of Beck.[1] Earlier results on this problem include the famous lower bound on the discrepancy of arithmetic progressions by Roth[2] and upper bounds for this problem and other results by Erdős and Spencer[3][4] and Sárközi (described on p. 39).[5] At that time, discrepancy problems were called quasi-Ramsey problems.

To get some intuition for this concept, let's have a look at a few examples.

The last example shows that we cannot expect to determine the discrepancy by looking at a single parameter like the number of hyperedges. Still, the size of the hypergraph yields first upper bounds.

Theorems

with n the number of vertices and m the number of edges.

The proof is a simple application of the probabilistic method: Let be a random coloring, i.e. we have

independently for all . Since is a sum of independent -1, 1 random variables. So we have for all and . Put for convenience. Then

Since a random coloring with positive probability has discrepancy at most , in particular, there are colorings that have discrepancy at most . Hence

To prove this, a much more sophisticated approach using the entropy function was necessary. Of course this is particularly interesting for . In the case , can be shown for n large enough. Therefore, this result is usually known to as 'Six Standard Deviations Suffice'. It is considered to be one of the milestones of discrepancy theory. The entropy method has seen numerous other applications, e.g. in the proof of the tight upper bound for the arithmetic progressions of Matoušek and Spencer[6] or the upper bound in terms of the primal shatter function due to Matoušek.[7]

This result, the Beck–Fiala theorem, is due to Beck and Fiala.[8] They bound the discrepancy by the maximum degree of . It is a famous open problem whether this bound can be improved asymptotically (modified versions of the original proof give 2t-1 or even 2t-3). Beck and Fiala conjectured that , but little progress has been made so far in this direction. Bednarchak and Helm[9] and Helm[10] improved the Beck-Fiala bound in tiny steps to (for a slightly restricted situation, i.e. ). A corollary of Beck's paper[1] – the first time the notion of discrepancy explicitly appeared – shows for some constant C. The latest improvement in this direction is due to Banaszczyk:[11] .

Classic theorems

Major open problems

Applications

Notes

  1. 1 2 J. Beck: "Roth's estimate of the discrepancy of integer sequences is nearly sharp", page 319-325. Combinatorica, 1, 1981
  2. K. F. Roth: "Remark concerning integer sequences", pages 257–260. Acta Arithmetica 9, 1964
  3. J. Spencer: "A remark on coloring integers", pages 43–44. Canad. Math. Bull. 15, 1972.
  4. P. Erdős and J. Spencer: "Imbalances in k-colorations", pages 379–385. Networks 1, 1972.
  5. P. Erdős and J. Spencer: "Probabilistic Methods in Combinatorics." Akadémia Kiadó, Budapest, 1974.
  6. J. Matoušek and J. Spencer: "Discrepancy in arithmetic progressions", pages 195–204. J. Amer. Math. Soc. 9, 1996.
  7. J. Matoušek: "Tight upper bound for the discrepancy of half-spaces", pages 593–601. Discrepancy and Computational Geometry 13, 1995.
  8. J. Beck and T. Fiala: "Integer making theorems", pages 1–8. Discrete Applied Mathematics 3, 1981.
  9. D. Bednarchak and M. Helm: "A note on the Beck-Fiala theorem", pages 147–149. Combinatorica 17, 1997.
  10. M. Helm: "On the Beck-Fiala theorem", page 207. Discrete Mathematics 207, 1999.
  11. W. Banaszczyk: "Balancing vectors and Gaussian measure of n-dimensional convex bodies", pages 351–360. Random Structures and Algorithms 12, 1998.

References

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