The Number of Lattice Rules of Specified Upper Class and Rank

Lyness, J.N.; Joe, Stephen

The Number of Lattice Rules of Specified Upper Class and Rank

dc.contributor.author	Lyness, J.N.
dc.contributor.author	Joe, Stephen
dc.date.accessioned	2009-02-10T23:01:14Z
dc.date.available	2009-02-10T23:01:14Z
dc.date.issued	2003
dc.description.abstract	The upper class of a lattice rule is a convenient entity for classification and other purposes. The rank of a lattice rule is a basic characteristic, also used for classification. By introducing a rank proportionality factor and obtaining certain recurrence relations, we show how many lattice rules of each rank exist in any prime upper class. The Sylow p-decomposition may be used to obtain corresponding results for any upper class.	en
dc.format.mimetype	application/pdf
dc.identifier.citation	Lyness, J.N. & Joe, Stephen(2003). The Number of Lattice Rules of Specified Upper Class and Rank. Bit Numerical Mathematics, 43(2), 413-426.	en
dc.identifier.doi	10.1023/A:1026048021823	en
dc.identifier.uri	https://hdl.handle.net/10289/2003
dc.language.iso	en
dc.publisher	Springer Netherlands	en
dc.relation.isPartOf	BIT Numerical Mathematics	en_NZ
dc.relation.uri	http://www.springerlink.com/content/h0018j5661g52463/?p=4e452a3790584091b9121432e00c5307&pi=11	en
dc.rights	This is an author’s version of an article published in the journal: BIT Numerical Mathematics. © Springer Netherlands. The original publication is available at www.springerlink.com.	en
dc.subject	mathematics	en
dc.subject	lattice rules	en
dc.subject	upper class	en
dc.subject	rank of lattice rule	en
dc.subject	sylow p- decomposition	en
dc.title	The Number of Lattice Rules of Specified Upper Class and Rank	en
dc.type	Journal Article	en
pubs.begin-page	413	en_NZ
pubs.edition	June	en_NZ
pubs.elements-id	29447
pubs.end-page	426	en_NZ
pubs.issue	2	en_NZ
pubs.volume	43	en_NZ