On Generalized Tribonacci Sedenions

· 2019 · math.RA · arXiv 1901.05312

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abstract

The sedenions form a 16-dimensional Cayley-Dickson algebra. In this work, we introduce the generalized Tribonacci sedenion and present some properties of this sedenion.

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On The Dynamics Of Solutions Of A Rational Difference Equation Via Generalized Tribonacci Numbers

math.DS · 2019-06-27 · unverdicted · novelty 5.0

Solutions to the rational difference equation x_{n+1} = γ / (x_n (x_{n-1} + α) + β) are expressed using generalized Tribonacci numbers, with accompanying stability and asymptotic analysis.

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On The Dynamics Of Solutions Of A Rational Difference Equation Via Generalized Tribonacci Numbers math.DS · 2019-06-27 · unverdicted · none · ref 17 · internal anchor
Solutions to the rational difference equation x_{n+1} = γ / (x_n (x_{n-1} + α) + β) are expressed using generalized Tribonacci numbers, with accompanying stability and asymptotic analysis.

On Generalized Tribonacci Sedenions

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