Weak colourings of Kirkman triple systems
Abstract
A δ-colouring of the point set of a block design is said to be weak if no block is monochromatic. The chromatic number (S) of a block design S is the smallest integer δ such that S has a weak δ-colouring. It has previously been shown that any Steiner triple system has chromatic number at least 3 and that for each v 1 or 36 there exists a Steiner triple system on v points that has chromatic number 3. Moreover, for each integer δ ≥ 3 there exist infinitely many Steiner triple systems with chromatic number δ. We consider colourings of the subclass of Steiner triple systems which are resolvable. We show that for each v 36 there exists a Kirkman triple system on v points with chromatic number 3. We also show that for each integer δ ≥ 3, there exist infinitely many Kirkman triple systems with chromatic number δ. We close with several open problems.
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