Constructing permutation arrays from groups

Bereg, Sergey; Levy, Avi; Sudborough, Ivan Hal

doi:10.1007/s10623-017-0381-1

Cited by 18 publications

(36 citation statements)

References 16 publications

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“…It contains 38 · 37 · 36 = 50, 616 permutations with Hamming distance at least 36, giving M (38, 36) ≥ 50, 616. Using the coset method [2], we found five cosets of P GL(2, 37) in S 38 , with Hamming distance 34 from P GL(2, 37) (see Table 8). The cosets are defined by the coset representatives α, β, γ, δ and θ: Note that for all i, j, (1 ≤ i < j ≤ 6), hd(M i ) = 36 and hd(M i , M j ) ≥ 34.…”

Section: General Parallel Partition With R Symbolsmentioning

confidence: 99%

“…The operation of contraction on a PA Y on Z n+1 with Hamming distance d + 1 results in new PA Y on Z n . As with the coset method, if Y is a good PA for M (n + 1, d), Y could exhibit a new lower bound for either M (n, d − 2) or M (n, d − 3), depending on conditions described in [2].…”

Section: General Parallel Partition With R Symbolsmentioning

confidence: 99%

“…Our coset search techniques are discussed in Section 6.3. n d r NEW Origin of Blocks (see Table 8 (54, 48)) 70 63 2 1, 503, 462 P P GL(2, 67) and 2 cosets (see M (68, 61)) Table 6: M (n, d) lower bounds obtained using parallel partition and extension (Theorem 6 and 7). The blocks used by these theorems were obtained by the coset method [2] (see Table 8). Columns: r denotes the number of new symbols, NEW denotes the new new bound.…”

Section: General Parallel Partition With R Symbolsmentioning

confidence: 99%

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Constructing permutation arrays using partition and extension

Bereg

Mojica

Morales

et al. 2019

Des. Codes Cryptogr.

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We give new lower bounds for M (n, d), for various positive integers n and d with n > d, where M (n, d) is the largest number of permutations on n symbols with pairwise Hamming distance at least d. Large sets of permutations on n symbols with pairwise Hamming distance d are needed for constructing error correcting permutation codes, which have been proposed for power-line communications. Our technique, partition and extension, is universally applicable to constructing such sets for all n and all d, d < n. We describe three new techniques, sequential partition and extension, parallel partition and extension, and a modified Kronecker product operation, which extend the applicability of partition and extension in different ways. We describe how partition and extension gives improved lower bounds for M (n, n − 1) using mutually orthogonal Latin squares (MOLS). We present efficient algorithms for computing new partitions: an iterative greedy algorithm and an algorithm based on integer linear programming. These algorithms yield partitions of positions (or symbols) used as input to our partition and extension techniques. We report many new lower bounds for M (n, d) found using these techniques for n up to 600.

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Section: General Parallel Partition With R Symbolsmentioning

confidence: 99%

Section: General Parallel Partition With R Symbolsmentioning

confidence: 99%

Section: General Parallel Partition With R Symbolsmentioning

confidence: 99%

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Constructing permutation arrays using partition and extension

Bereg

Mojica

Morales

et al. 2019

Des. Codes Cryptogr.

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“…As we want to consider permutations on F q (not P 1 (F q )) we need to eliminate occurrences of the symbol ∞ using an operation called contraction [1]. If W (∞) = ∞, then we can simply eliminate the symbol ∞, which of course makes no new agreements.…”

Section: Hamming Distance Of Prfsmentioning

confidence: 99%

“…Permutation arrays (PAs) with large Hamming distance have been the subject of many recent papers with applications in the design of error correcting codes. New lower bounds for the size of such permutation arrays are given, for example, in [1,2,3,4,5,6,7,12,15,14,19,20,22].…”

Section: Introductionmentioning

confidence: 99%

New lower bounds for permutation arrays using contraction

Bereg

Miller

Mojica

et al. 2019

Des. Codes Cryptogr.

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We consider rational functions of the form V (x)/U (x), where both V (x) and U (x) are polynomials over the finite field F q . Polynomials that permute the elements of a field, called permutation polynomials (P P s), have been the subject of research for decades. Let P 1 (F q ) denote Z q ∪ {∞}. If the rational function, V (x)/U (x), permutes the elements of P 1 (F q ), it is called a permutation rational function (PRF). Let N d (q) denote the number of PPs of degree d over F q , and let N v,u (q) denote the number of PRFs with a numerator of degree v and a denominator of degree u. It follows that N d,0 (q) = N d (q), so PRFs are a generalization of PPs. The number of monic degree 3 PRFs is known [11]. We develop efficient computational techniques for N v,u (q), and use them to show N 4,3 (q) = (q + 1)q 2 (q − 1) 2 /3, for all prime powers q ≤ 307, N 5,4 (q) > (q + 1)q 3 (q − 1) 2 /2, for all prime powers q ≤ 97, and N 4,4 (p) = (p + 1)p 2 (p − 1) 3 /3, for all primes p ≤ 47. We conjecture that these formulas are, in fact, true for all prime powers q. Let M (n, D) denote the maximum number of permutations on n symbols with pairwise Hamming distance D. Computing improved lower bounds for M (n, D) is the subject of much current research with applications in error correcting codes. Using PRFs, we obtain significantly improved lower bounds on M (q, q − d) and M (q + 1, q − d), for d ∈ {5, 7, 9}.

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Permutation Codes, Hamming Graphs and Turán Graphs

Barta

Montemanni

2019

Lecture Notes in Electrical Engineering

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Constructing permutation arrays from groups

Cited by 18 publications

References 16 publications

Constructing permutation arrays using partition and extension

Constructing permutation arrays using partition and extension

New lower bounds for permutation arrays using contraction

Permutation Codes, Hamming Graphs and Turán Graphs

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