Orthomorphisms of Groups and Orthogonal Latin Squares. I

Johnson, Diane; Dulmage, A. L.; Mendelsohn, N. S.

doi:10.4153/cjm-1961-031-7

Cited by 106 publications

(40 citation statements)

References 13 publications

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“…If G is an abelian group and θ 2 is orthogonal to θ 1 , then θ 1 is orthogonal to θ 2 too. This follows from the well-known fact that, for an abelian group (G, +), the inverse of the complete mapping (orthomorphism) is also a complete mapping (orthomorphism) ( [5,13] (2.3), then all of its parastrophes /, \, //, \\, · can be also derived by an orthomorphisms (see [5] and [26]). This fact can be especially useful for designing cryptographic primitives, like encoding and decoding functions.…”

Section: Diagonal Methods and Orthomorphismsmentioning

confidence: 93%

Shapeless quasigroups derived by Feistel orthomorphisms

Mileva¹,

Markovski²

2012

Glas. Mat. Ser. III

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Abstract.Shapeless quasigroups are needed for cryptography purposes. In this paper, we construct shapeless quasigroups by the diagonal method from orthomorphisms over abelian groups. We use generalizations of Feistel networks as orthomorphisms. We introduce parameters into several types of Extended Feistel networks and Generalized Feistel-non linear feedback shift registers and, by suitable choice of the parameter values, different shapeless quasigroup can be used in every application.

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Section: Diagonal Methods and Orthomorphismsmentioning

confidence: 93%

Shapeless quasigroups derived by Feistel orthomorphisms

Mileva¹,

Markovski²

2012

Glas. Mat. Ser. III

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“…Before we formulate the conditions of Theorem 1 of [1] for T -quasigroups we recall that a permutation α of a group Q(+) is called an orthomorphism (respectively, a complete mapping) if x − αx = βx(x + αx = βx), where β is a permutation of Q and −x = I x is the inverse element for x in the group Q(+) [4].…”

Section: Check Character Systems Over T −Quasigroupsmentioning

confidence: 99%

Check Character Systems Using Quasigroups: II

2005

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In this part of the article we continue to research check character systems with one check character over quasigroups under check equations which have one permutation. These systems always detect all single errors (i.e. errors in only one component of a code word) and can detect some other errors arising during transmission of data. We study check character systems over T -quasigroups. These quasigroups are isotopic to abelian groups and generalize the well-known class of medial quasigroups. We establish some properties of a T -quasigroup so that the check character systems over it are able to detect transpositions, jump transpositions, twin errors and jump twin errors. We also give some models of T -quasigroups, which satisfy all of the required properties for detection of errors of each of the considered types.

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“…В работе [21] для групп небольших порядков (от 3 до 12) поиск орто-морфизмов группы производится с помощью компьютерных вычислений. Используя ортоморфизмы групп, авторы находят максимальные системы ОЛК небольших порядков.…”

Section: (5)unclassified

“…В статьях [15][16][17] латинских квадратов порядка n для любого n ≠ 2, 6 и доказано, что эта гипотеза верна для всех n при 0 50 n ≤ ≤ и всех n, бόльших 50, исключая, возможно, числа вида 6k + 2. Их метод был основан на известной схеме Мендельсона [21], которая дает бесконечно много конт-примеров к гипотезе Эйлера, но, к сожалению, не применима при n ≡ 2 (mod 6). В работе [17] предложен новый способ конструирования степенных множеств латинских квадратов (квазигрупп) порядка р для любого простого 11 р ≥ .…”

Section: (5)unclassified

О Методах Построения Систем Ортогональных Квазигрупп С Использованием Групп

Glukhov¹

2011

Матем. вопр. криптогр.

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Предлагается метод построения систем ортогональных квазигрупп и ортогональных латинских квадратов на основе групп Фробениуса. Пока-зано, что в схему этого метода укладываются многие (но не все) известные методы построения ортогональных латинских квадратов с использованием групп.Ключевые слова: квазигруппа, латинский квадрат, система ортогональ-ных квазигрупп (латинских квадратов), регулярное множество подстановок, регулярный автоморфизм группы On a method of construction of orthogonal quasigroup systems by means of groups M. M. Gluhov Academy of Cryptography of Russian Federation, MoscowAbstract. We suggest a method of construction of orthogonal quasigroups systems and orthogonal Latin squares by means of Frobenius groups. It is proved that this method generalizes many (but not all) existing methods of orthogonal Latin squares construction by means of groups.

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Orthomorphisms of Groups and Orthogonal Latin Squares. I

Cited by 106 publications

References 13 publications

Shapeless quasigroups derived by Feistel orthomorphisms

Shapeless quasigroups derived by Feistel orthomorphisms

Check Character Systems Using Quasigroups: II

О Методах Построения Систем Ортогональных Квазигрупп С Использованием Групп

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