On the Size of a Maximum Transversal in a Steiner Triple System

A. E. Brouwer

doi:10.4153/CJM-1981-090-7

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Let (X, ) be a Steiner triple system on v = |X| points, and suppose that is a partial parallel class (transversal, clear set, set of pairwise disjoint blocks) of maximum size . We want to derive a bound on . (I conjecture that in fact r is bounded, e.g., r ≦ 4 – 4 is attained for the Fano plane, but all that has been proved so far (cf. [1], [2]) are bounds r < C.v for some C. Here we shall prove r < 5v2/3.)

Define a sequence of positive real numbers by q0 = Q · r2/v, , where l is determined by ql ≧ 6, , i.e.,

(The constant Q will be chosen later.) Define inductively sets Ai, Ki and collections as follows. Let

References

1. Lindner, C. C. and Phelps, K. T., A note on partial parallel classes in Steiner systems, Discr. Math. 24 (1978), 109–112.Google Scholar

2. Wang, S. P., On self orthogonal Latin squares and partial transversals of Latin squares, Ph.D. thesis, Ohio State University, Columbus, Ohio (1978).Google Scholar

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On the Size of a Maximum Transversal in a Steiner Triple System

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