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DCC
2007
IEEE

Lifting of divisible designs

15 years 1 days ago
Lifting of divisible designs
The aim of this paper is to present a construction of t-divisible designs for t > 3, because such divisible designs seem to be missing in the literature. To this end, tools such as finite projective spaces and their algebraic varieties are employed. More precisely, in a first step an abstract construction, called t-lifting, is developed. It starts from a set X containing a tdivisible design and a group G acting on X. Then several explicit examples are given, where X is a subset of PG(n, q) and G is a subgroup of GLn+1(q). In some cases X is obtained from a cone with a Veronesean or an h-sphere as its basis. In other examples X arises from a projective embedding of a Witt design. As a result, for any integer t 2 infinitely many non-isomorphic t-divisible designs are found. 2000 Mathematics Subject Classification. 05B30, 51E20, 20B25. Key words: divisible design, finite projective space, Veronese variety.
Andrea Blunck, Hans Havlicek, Corrado Zanella
Added 25 Dec 2009
Updated 25 Dec 2009
Type Conference
Year 2007
Where DCC
Authors Andrea Blunck, Hans Havlicek, Corrado Zanella
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