Some algebraic relations on integer sequences involving oblong and balancing numbers

Özkoç, Arzu

Publication:
Some algebraic relations on integer sequences involving oblong and balancing numbers

Date

2016-07

Authors

Tekcan, Ahmet

Eraşık, Meltem E.

Authors

Özkoç, Arzu

Type

Article

Publisher:

Charles Babbage Research Centre

Abstract

Let k >= 0 be an integer. Oblong (pronic) numbers are numbers of the form O-k = k(k+1). In this work, we set a new integer sequence B = B-n(k) defined as B-0 = 0, B-1 = 1 and B-n = O-k Bn-1 - Bn-2 for n >= 2 and then derived some algebraic relations on it. Later, we give some new results on balancing numbers via oblong numbers.

Keywords

Mathematics, Fibonacci numbers, Lucas numbers, Pell numbers, Oblong numbers, Balancing numbers, Binary linear recurrences, Circulant matrix, Spectral norm, Simple continued fraction expansion, Cross-ratio

Citation

Tekcan, A. vd. (2016). "Some algebraic relations on integer sequences involving oblong and balancing numbers". Ars Combinatoria, 128, 11-31.

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Some algebraic relations on integer sequences involving oblong and balancing numbers

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Publication: Some algebraic relations on integer sequences involving oblong and balancing numbers

Date

Organizational Units

Authors

Authors

Advisor

Language

Type

Publisher:

Journal Title

Journal ISSN

Volume Title

Abstract

Description

Source:

Keywords:

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Endorsement

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Supplemented By

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Publication:
Some algebraic relations on integer sequences involving oblong and balancing numbers