Minimal generalized permutations

Iranmanesh, A.; Faghihi, A.

doi:10.1007/BF03012278

A. Iranmanesh^1,2 &
A. Faghihi^1,2

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Abstract

In this paper, we obtain the number of the minimal generalized permutations on a finite set. Also, we determine the minimal generalized permutations on a setX of cardinality less than or equal to 4.

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References

P. Corsini,Prolegomena of Hypergroup, Second Edition, Aviani Editor, 1993.
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MathSciNet MATH Google Scholar
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Authors and Affiliations

Department of Mathematics, TarbiatModarres University, P.O.Box 14115-111, Tehran, Iran
A. Iranmanesh & A. Faghihi
Center for Theoretical Physics and Mathematics, P.O.BOX 11365-8486, Aeoi, Tehran, Iran
A. Iranmanesh & A. Faghihi

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A. Iranmanesh
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A. Faghihi
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Correspondence to A. Iranmanesh.

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Iranmanesh, A., Faghihi, A. Minimal generalized permutations. Korean J. Comput. & Appl. Math. 7, 685–691 (2000). https://doi.org/10.1007/BF03012278

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Received: 16 September 1999
Revised: 30 November 1999
Published: 01 September 2000
Issue Date: September 2000
DOI: https://doi.org/10.1007/BF03012278

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20N20

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Minimal generalized permutations

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On permutation polytopes: notions of equivalence

The class of minimax groups is countably recognizable

Arithmetic functions and fixed points of powers of permutations

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Minimal generalized permutations

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Access this article

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Similar content being viewed by others

On permutation polytopes: notions of equivalence

The class of minimax groups is countably recognizable

Arithmetic functions and fixed points of powers of permutations

References

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