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Year: 1994 Publisher: Kishinau, Moldova : The Institute,
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Quasigroups --- Group theory --- Group theory. --- Quasigroups.
Periodical
Year: 1994 Publisher: Kishinau, Moldova : The Institute,
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Quasigroups --- Group theory --- Group theory. --- Quasigroups.
Book
ISBN: 2760607763 Year: 1986 Publisher: Montréal, Québec, Canada : Presses de l'Université de Montréal,
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Periodical
Year: 1994 Publisher: Kishinau, Moldova : The Institute,
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Book
ISBN: 0840503539 Year: 1977 Publisher: Montréal : Presses de l'Université de Montréal,
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Ordered algebraic structures --- Algebra, Universal. --- Embedding theorems. --- Magic squares. --- Quasigroups.
Book
ISBN: 3885380080 Year: 1990 Publisher: Berlin : Heldermann,
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Algebra, Universal --- Group theory. --- Quasigroups. --- Algèbre universelle. --- Analyse combinatoire --- Géometrie --- Groupes, Théorie des --- Lie, Algèbres de --- Quasigroupes.
ISBN: 0821809792 9780821809792 Year: 1999 Volume: no. 94 Publisher: Providence Published for the Conference Board of the Mathematical Sciences by the American Mathematical Society
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Ordered algebraic structures --- Division algebras. --- Algèbre à division. --- 512.55 --- Algebras, Division --- Algebraic fields --- Quasigroups --- Rings (Algebra) --- Rings and modules --- 512.55 Rings and modules --- Algèbre à division. --- Division algebras --- Algèbres à division.
Book
ISBN: 9781470435547 1470435543 Year: 2019 Publisher: Providenc American Mathematical Society
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"A Moufang set is essentially a doubly transitive permutation group such that each point stabilizer contains a normal subgroup which is regular on the remaining vertices; these regular normal subgroups are called the root groups, and they are assumed to be conjugate and to generate the whole group. It has been known for some time that every Jordan division algebra gives rise to a Moufang set with abelian root groups. We extend this result by showing that every structurable division algebra gives rise to a Moufang set, and conversely, we show that every Moufang set arising from a simple linear algebraic group of relative rank one over an arbitrary field k of characteristic different from 2 and 3 arises from a structurable division algebra. We also obtain explicit formulas for the root groups, the T-map and the Hua maps of these Moufang sets. This is particularly useful for the Moufang sets arising from exceptional linear algebraic groups"--
Lie algebras. --- Jordan algebras. --- Linear algebraic groups. --- Lie, Algèbres de. --- Jordan, Algèbres de. --- Groupes algébriques linéaires. --- Division algebras. --- Moufang loops. --- Combinatorial group theory. --- Algèbre à division --- Moufang, Boucles de --- Algèbres de Jordan --- Théorie combinatoire des groupes --- Division algebras --- Moufang loops --- Jordan algebras --- Combinatorial group theory --- Combinatorial groups --- Groups, Combinatorial --- Combinatorial analysis --- Group theory --- Algebra, Abstract --- Algebras, Linear --- Loops, Moufang --- Loops (Group theory) --- Algebras, Division --- Algebraic fields --- Quasigroups --- Rings (Algebra)
Book
ISBN: 9781470422134 Year: 2015 Publisher: Providence (R.I.) : American mathematical society,
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Knot theory. --- Low-dimensional topology. --- Manifolds and cell complexes -- Low-dimensional topology -- Knots and links in $S 3$. --- Algebraic topology -- Classical topics -- Degree, winding number. --- Group theory and generalizations -- Other generalizations of groups -- Loops, quasigroups. --- Group theory and generalizations -- Permutation groups -- General theory for finite groups. --- Algebraic topology -- Homology and cohomology theories -- Other homology theories. --- Manifolds and cell complexes -- Low-dimensional topology -- Fundamental group, presentations, free differential calculus. --- Manifolds and cell complexes -- Low-dimensional topology -- Invariants of knots and 3-manifolds. --- Group theory and generalizations -- Other generalizations of groups -- Sets with a single binary operation (groupoids). --- Manifolds and cell complexes -- PL-topology -- Knots and links (in high dimensions).
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