2019
DOI: 10.1007/s10623-019-00607-y
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New lower bounds for permutation arrays using contraction

Abstract: 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 n… Show more

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Cited by 5 publications
(1 citation statement)
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“…To illustrate G-cycles on coefficients, consider GF (2 4 ). The elements of GF (2 4 ) are partitioned into 6 disjoint equivalence classes (i.e., G-cycles on coefficients) by the G-map, namely the equivalence classes [0], [1], [2], [4], [6], and [8]. To see this, observe that where mod 15 arithmetic is used in the exponents.…”
Section: The G-mapmentioning
confidence: 99%
“…To illustrate G-cycles on coefficients, consider GF (2 4 ). The elements of GF (2 4 ) are partitioned into 6 disjoint equivalence classes (i.e., G-cycles on coefficients) by the G-map, namely the equivalence classes [0], [1], [2], [4], [6], and [8]. To see this, observe that where mod 15 arithmetic is used in the exponents.…”
Section: The G-mapmentioning
confidence: 99%