Subsequent to Köhler's result in [1], Satz 8, we show that strictly cyclic SQS(2p), p prime number and p≡53,77 (120) exist if a certain number theoretic ...
Egmont Kohler [l] investigated strictly cyclic SQS(2p) with p a prime number and p = 5 (12), where a system SQS(u) is called strictly cyclic if it admits a ...
On the existence of cyclic Steiner Quadruple Systems SQS(2p) · Contents. Discrete Mathematics. Volume 97, Issue 1-3 · PREVIOUS ARTICLE. A note on check character ...
Helmut Siemon: On the existence of cyclic Steiner Quadruple systems SQS (2p). Discret. Math. 97(1-3): 377-385 (1991). manage site settings.
In this thesis we are concerned with the existence of a particular kind of Steiner quadruple systems. The origins of the problem go back as far as 1852 when ...
H. Siemon, On the existence of cyclic Steiner quadruple systems SQS(2p), Discrete Math., Vol. 97 (1991) pp. 377-385. Google Scholar. H ...
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H. Siemon, On the existence of cyclic Steiner quadruple systems SQS(2p), Discrete Math., to appear. Google Scholar ...
This paper gives some recursive constructions for cyclic 3-designs. Using these constructions we improve Grannell and Griggs's construction for cyclic ...
Apr 14, 2012 · It is will known that Steiner quadruple systems of order v, or SQS(v), exist if and only if v = 2, 4 mod 6. Universal cycles, introduced by ...
q ~ SQS (v) so that t is contained in q. Hanani proved in [5] that the necessary condition v - 2, 4 (6) for the existence of a SQS (v) is also sufficient.