On a theorem of Schreier and Ulam for countable permutations
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Publication:2559472
DOI10.1016/0021-8693(73)90141-5zbMath0257.05005OpenAlexW2084385998MaRDI QIDQ2559472
Publication date: 1973
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0021-8693(73)90141-5
Related Items (16)
Cubes of Conjugacy Classes Covering the Infinite Symmetric Group ⋮ Conjugacy Classes Whose Square is an Infinite Symmetric Group ⋮ ON MODEL-THEORETIC CONNECTED GROUPS ⋮ The shapley value for countably many players ⋮ Parity features for classes of the infinite symmetric group ⋮ A rigidity theorem for automorphism groups of trees. ⋮ Normal Subgroups of Doubly Transitive Automorphism Groups of Chains ⋮ 2010 European Summer Meeting of the Association for Symbolic Logic. Logic Colloquium '10 ⋮ Monoids of injective maps closed under conjugation by permutations. ⋮ The product of two reflection classes of the symmetric group ⋮ Squares of Conjugacy Classes in the Infinite Symmetric Groups ⋮ On a theorem of Baer, Schreier, and Ulam for permutations ⋮ The reverse spelling of an FPrt-universal word in two letters ⋮ Products of Involution Classes in Infinite Symmetric Groups ⋮ Products of conjugacy classes of the infinite symmetric groups ⋮ The equation \(s=(x^ 2y^ 2)^ 3y^ 2\) is solvable in the symmetric group on Z
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