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dc.contributor.authorLarcombe, Peter J.
dc.contributor.authorFennessey, Eric J.
dc.date.accessioned2016-11-16T15:57:19Z
dc.date.available2016-11-16T15:57:19Z
dc.date.issued2016-08
dc.identifier.citationLarcombe, P. J. and Fennessey, E. J. (2016) 'On a scaled balanced-power product recurrence', Fibonacci Quarterly, 54 (3), pp. 242-246en
dc.identifier.issn0015-0517
dc.identifier.urihttp://hdl.handle.net/10545/620866
dc.description.abstractA power product recurrence (due to M. W. Bunder) is extended here by the introduction of a scaling factor, and delivers a sequence whose general term closed form is derived for both degenerate and non-degenerate characteristic root cases. It is shown how recurrence parameter conditions dictate the nature of each solution type, and a fundamental link between them is highlighted together with some other observations and results.
dc.language.isoenen
dc.publisherThe Fibonacci Associationen
dc.relation.urlhttp://www.fq.math.ca/index.htmlen
dc.relation.urlhttp://www.fq.math.ca/53-4.htmlen
dc.rights.urihttp://creativecommons.org/licenses/by/4.0/en
dc.subjectDiscrete mathematicsen
dc.subjectApplied mathematicsen
dc.titleOn a scaled balanced-power product recurrenceen
dc.typeArticleen
dc.contributor.departmentUniversity of Derbyen
dc.identifier.journalFibonacci Quarterlyen
html.description.abstractA power product recurrence (due to M. W. Bunder) is extended here by the introduction of a scaling factor, and delivers a sequence whose general term closed form is derived for both degenerate and non-degenerate characteristic root cases. It is shown how recurrence parameter conditions dictate the nature of each solution type, and a fundamental link between them is highlighted together with some other observations and results.


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