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https://doi.org/10.1016/s0167-5060(08)70186-9
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Cite Journal: Annals of Discrete Mathematics |  Publication Date: Jan 1, 1980 |
 Citations: 7 |
A Steiner quadruple system of order v is said to be cyclic if it admits an automorphism of order v. In this paper we enumerate all cyclic Steiner quadruple systems of order 22 and establish that there are exactly 21 nonisomorphic cyclic SQS(22) yielding a total of 210 distinct cyclic quadruple systems of order 22.
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