Steiner Quadruple Systems with Minimum Colorable Derived Designs: Constructions and Applications

Abstract

An r-block-coloring, simply r-coloring, of a Steiner triple system STS(v) is a partition of the block set into r color classes, each color class being a partial parallel class. The chromatic index of STS(v), denoted by (v), is the smallest r for which an r-coloring of an STS(v) exists. A minimum colorable Steiner triple system mcSTS(v) is an STS(v) admitting a (v)-coloring. We generalize the notion of an RDSQS (a Steiner quadruple system SQS with resolvable derived designs) to mcDSQS, representing an SQS whose derived design at every point is minimum colorable. This is motivated from an application in non-binary diameter perfect codes. The purpose of this paper is to display a few recursive constructions to produce mcDSQSs via Steiner systems S(3,K,v) with certain properties. Among others, a construction for mcDSQSs is developed, which is also new even for RDSQSs; special constructions concentrating only on mcDSQS(6n+2)s are demonstrated as well. As the main results, both a new infinite family of RDSQS(6n+4)s and the first infinite family of mcDSQS(6n+2)s are constructed. To be specific, an RDSQS(22m+1+2) and an mcDSQS(2· 9m+2) are proved to exist, in which the former class gives rise to a new infinite family of large sets of Kirkman triple systems. As applications, the smallest q is determined such that a diameter perfect constant-weight (n,14n3,6;4)q code exists where n ∈\ 2· 9m+2:m≥ 1\\ 22m+1+2:m≥ 0\.

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