Disjunct matrix

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In mathematics, a logical matrix may be described as d-disjunct and/or d-separable. These concepts play a pivotal role in the mathematical area of non-adaptive group testing.

In the mathematical literature, d-disjunct matrices may also be called super-imposed codes[1] or d-cover-free families.[2]

According to Chen and Hwang (2006),[3]

  • A matrix is said to be d-separable if no two sets of d columns have the same boolean sum.
  • A matrix is said to be -separable (that's d with an overline) if no two sets of d-or-fewer columns have the same boolean sum.
  • A matrix is said to be d-disjunct if no set of d columns has a boolean sum which is a superset of any other single column.

The following relationships are "well-known":[3]

  • Every -separable matrix is also -disjunct.[3]
  • Every -disjunct matrix is also -separable.[3]
  • Every -separable matrix is also -separable (by definition).

Concrete examples

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The following   matrix is 2-separable, because each pair of columns has a distinct sum. For example, the boolean sum (that is, the bitwise OR) of the first two columns is  ; that sum is not attainable as the sum of any other pair of columns in the matrix.

However, this matrix is not 3-separable, because the sum of columns 1, 2, and 3 (namely  ) equals the sum of columns 1, 4, and 5.

This matrix is also not  -separable, because the sum of columns 1 and 8 (namely  ) equals the sum of column 1 alone. In fact, no matrix with an all-zero column can possibly be  -separable for any  .

 

The following   matrix is  -separable (and thus 2-disjunct) but not 3-disjunct.

 

There are 15 possible ways to choose 3-or-fewer columns from this matrix, and each choice leads to a different boolean sum:

columns boolean sum columns boolean sum
none 000000 2,3 011110
1 110000 2,4 101101
2 001100 3,4 111011
3 011010 1,2,3 111110
4 100001 1,2,4 111101
1,2 111100 1,3,4 111011
1,3 111010 2,3,4 111111
1,4 110001

However, the sum of columns 2, 3, and 4 (namely  ) is a superset of column 1 (namely  ), which means that this matrix is not 3-disjunct.

Application of d-separability to group testing

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The non-adaptive group testing problem postulates that we have a test which can tell us, for any set of items, whether that set contains a defective item. We are asked to come up with a series of groupings that can exactly identify all the defective items in a batch of n total items, some d of which are defective.

A  -separable matrix with   rows and   columns concisely describes how to use t tests to find the defective items in a batch of n, where the number of defective items is known to be exactly d.

A  -disjunct matrix (or, more generally, any  -separable matrix) with   rows and   columns concisely describes how to use t tests to find the defective items in a batch of n, where the number of defective items is known to be no more than d.

Practical concerns and published results

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For a given n and d, the number of rows t in the smallest d-separable   matrix may (according to current knowledge) be smaller than the number of rows t in the smallest d-disjunct   matrix, but in asymptotically they are within a constant factor of each other.[3] Additionally, if the matrix is to be used for practical testing, some algorithm is needed that can "decode" a test result (that is, a boolean sum such as  ) into the indices of the defective items (that is, the unique set of columns that produce that boolean sum). For arbitrary d-disjunct matrices, polynomial-time decoding algorithms are known; the naïve algorithm is  .[4] For arbitrary d-separable but non-d-disjunct matrices, the best known decoding algorithms are exponential-time.[3]

Porat and Rothschild (2008) present a deterministic  -time algorithm for constructing a d-disjoint matrix with n columns and   rows.[5]

See also

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References

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  1. ^ De Bonis, Annalisa; Vaccaro, Ugo (2003). "Constructions of generalized superimposed codes with applications to group testing and conflict resolution in multiple access channels". Theoretical Computer Science. 306 (1–3): 223–243. doi:10.1016/S0304-3975(03)00281-0. MR 2000175.
  2. ^ Paul Erdős; Péter Frankl; Zoltán Füredi (1985). "Families of finite sets in which no set is covered by the union of r others" (PDF). Israel Journal of Mathematics. 51 (1–2): 79–89. doi:10.1007/BF02772959. ISSN 0021-2172.
  3. ^ a b c d e f Hong-Bin Chen; Frank Hwang (2006-12-21). "Exploring the missing link among d-separable, d-separable and d-disjunct matrices". Discrete Applied Mathematics. 155 (5): 662–664. CiteSeerX 10.1.1.848.5161. doi:10.1016/j.dam.2006.10.009. MR 2303978.
  4. ^ Piotr Indyk; Hung Q. Ngo; Atri Rudra (2010). "Efficiently Decodable Non-adaptive Group Testing". Proceedings of the 21st ACM-SIAM Symposium on Discrete Algorithms (SODA). hdl:1721.1/63167. ISSN 1071-9040.
  5. ^ Ely Porat; Amir Rothschild (2008). "Explicit Non-Adaptive Combinatorial Group Testing Schemes". Proceedings of the 35th International Colloquium on Automata, Languages and Programming (ICALP): 748–759. arXiv:0712.3876. Bibcode:2007arXiv0712.3876P.

Further reading

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  • Atri Rudra's book on Error Correcting Codes: Combinatorics, Algorithms, and Applications (Spring 201), Chapter 17 Archived 2015-04-02 at the Wayback Machine
  • Dýachkov, A. G., & Rykov, V. V. (1982). Bounds on the length of disjunctive codes. Problemy Peredachi Informatsii [Problems of Information Transmission], 18(3), 7–13.
  • Dýachkov, A. G., Rashad, A. M., & Rykov, V. V. (1989). Superimposed distance codes. Problemy Upravlenija i Teorii Informacii [Problems of Control and Information Theory], 18(4), 237–250.
  • Füredi, Zoltán (1996). "On r-Cover-free Families". Journal of Combinatorial Theory. Series A. 73 (1): 172–173. doi:10.1006/jcta.1996.0012.