Each invertible sharply \(d\)-transitive finite permutation set with \(d\geq 4\) is a group
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Publication:1840657
DOI10.1023/A:1011211907282zbMath0971.20001MaRDI QIDQ1840657
Pasquale Quattrocchi, Arrigo Bonisoli
Publication date: 29 October 2001
Published in: Journal of Algebraic Combinatorics (Search for Journal in Brave)
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Related Items (4)
Invertible sharply \(n\)-transitive sets ⋮ Conway’s groupoid and its relatives ⋮ A construction and characterization of new sharply 3-transitive permutation sets contained in \(P\varGamma L(2,K)\) ⋮ Unnamed Item
Cites Work
- \(k\)-transitive permutation groups and \(k\)-planes
- Finite Minkowski planes in which every circle-symmetry is an automorphism
- A computer search for finite projective planes of order 9
- Diagram geometries for sharply \(n\)-transitive sets of permutations or of mappings
- Scharf n-fach transitive Permutationsmengen
- Invertible sharply \(n\)-transitive sets
- A result concerning the existence of certain finite Minkowski-2- structures
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