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Asymptotic properties of locally extensible designs

✍ Scribed by R. C. Mullin; S. A. Vanstone

Book ID
104641807
Publisher
Springer
Year
1984
Tongue
English
Weight
434 KB
Volume
15
Category
Article
ISSN
0046-5755

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✦ Synopsis

An (n + 1, 1)-design D is locally extensible at a block B if D can be embedded in an (n + 1, 1)-design having a block B* of cardinality n + 1 and such that B c B*. IfD is embeddable in a finite projective plane of order n, then D is called globally extensible. In this paper, we investigate the asymptotic behaviour of locally extensible designs and Euclidean designs. We study the relationship between locally extensible and extensible designs and the uniqueness of such embeddings. It is shown that, for n, I and t sufficiently large, any (n + i, 1)-design which has minimum block length I and which is locally extensible at t of its blocks is globally extensible.

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