Some algebraic relations on integer sequences involving oblong and balancing numbers
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Date
2016-07
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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.
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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.