Steiner Systems over Mixed Alphabet and Related Designs
Abstract
A mixed Steiner system MS(t,k,Q) is a set (code) C of words of weight k over an alphabet Q, where not all coordinates of a word have the same alphabet size, each word of weight t, over Q, has distance k-t from exactly one codeword of C, and the minimum distance of the code 2(k-t)+1. Mixed Steiner systems are constructed from perfect mixed codes, resolvable designs, large set, orthogonal arrays, and a new type of pairs-triples design. Necessary conditions for the existence of mixed Steiner systems are presented and it is proved that there are no large sets of these Steiner systems.
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