Non-isomorphic 2-perfect 6-cycle systems of order 13

Gower R.A.H. (1991) Non-isomorphic 2-perfect 6-cycle systems of order 13. Bulletin of the Australian Mathematical Society, 44 3: 381-385. doi:10.1017/S0004972700029877


Author Gower R.A.H.
Title Non-isomorphic 2-perfect 6-cycle systems of order 13
Journal name Bulletin of the Australian Mathematical Society   Check publisher's open access policy
ISSN 1755-1633
Publication date 1991-01-01
Sub-type Article (original research)
DOI 10.1017/S0004972700029877
Open Access Status Not yet assessed
Volume 44
Issue 3
Start page 381
End page 385
Total pages 5
Subject 2600 Mathematics
Abstract Running a computer search for new, cyclic, 2-perfect 6-cycle systems of order 13 and constructing the quasigroups which arise from such systems enabled the author to establish that there are at most two such non-isomorphic systems. Then by using two-variable laws of the quasigroups it is shown that there are exactly two non-isomorphic 2-perfect 6-cycle systems of order 13 which are cyclic.
Q-Index Code C1
Q-Index Status Provisional Code
Institutional Status Unknown

Document type: Journal Article
Sub-type: Article (original research)
Collection: Scopus Import - Archived
 
Versions
Version Filter Type
Citation counts: Scopus Citation Count Cited 1 times in Scopus Article | Citations
Google Scholar Search Google Scholar
Created: Tue, 23 Aug 2016, 15:31:02 EST by System User