In search of 4- (12,6,4) designs. Part III

dc.contributor.author	Breach, Derrick Rodney
dc.contributor.author	Street, Anne Penfold
dc.date.accessioned	2015-10-13T23:49:53Z
dc.date.available	2015-10-13T23:49:53Z
dc.date.issued	1993	en
dc.description.abstract	A 4-(12, 6, 4) design that is not also a 5-(12, 6, 1) design must have at least one pair of blocks with five points in common. It is shown that there are just nine non-isomorphic such designs; so, including the 5-(12, 6, 1) design, there are ten 4-(12, 6, 4) designs. These designs are characterised by. the orders of their automorphism groups and they all contain a 4-(11, 5, 1) design.	en
dc.identifier.uri	http://hdl.handle.net/10092/11174
dc.language.iso	en
dc.publisher	University of Canterbury. Mathematics	en
dc.relation.isreferencedby	NZCU	en
dc.rights	Copyright Derrick Rodney Breach	en
dc.rights.uri	https://canterbury.libguides.com/rights/theses	en
dc.subject.anzsrc	Field of Research::01 - Mathematical Sciences	en
dc.title	In search of 4- (12,6,4) designs. Part III	en
dc.type	Discussion / Working Papers
thesis.degree.grantor	University of Canterbury	en
thesis.degree.level	Research Report	en
thesis.degree.name	Research Report	en
uc.bibnumber	381213	en
uc.college	Faculty of Engineering	en

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