The Geometry of Frequency Squares
| Contribuinte(s) |
Algebraic Combinatorics Institute of Mathematics & Physics (ADT) |
|---|---|
| Data(s) |
08/12/2008
08/12/2008
01/11/2001
|
| Resumo |
Mavron, Vassili; Jungnickel, D.; McDonough, T.P., (2001) 'The Geometry of Frequency Squares', Journal of Combinatorial Theory, Series A 96, pp.376-387 RAE2008 This paper establishes a correspondence between mutually orthogonal frequency squares (MOFS) and nets satisfying an extra property (?framed nets?). In particular, we provide a new proof for the bound on the maximal size of a set of MOFS and obtain a geometric characterisation of the case of equality: necessary and sufficient conditions for the existence of a complete set of MOFS are given in terms of the existence of a certain type of PBIBD based on the L2-association scheme. We also discuss examples obtained from classical affine geometry and recursive construction methods for (complete) sets of MOFS. Peer reviewed |
| Formato |
12 |
| Identificador |
Mavron , V C , Jungnickel , D & McDonough , T 2001 , ' The Geometry of Frequency Squares ' Journal of Combinatorial Theory, Series A , vol 96 , no. 2 , pp. 376-387 . DOI: 10.1006/jcta.2001.3196 0097-3165 PURE: 88599 PURE UUID: 8c716c5b-5278-4bb3-963f-239b515cf5f1 dspace: 2160/1418 |
| Idioma(s) |
eng |
| Relação |
Journal of Combinatorial Theory, Series A |
| Tipo |
/dk/atira/pure/researchoutput/researchoutputtypes/contributiontojournal/article |
| Direitos |
