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The complex-type <i>k</i> -Fibonacci sequences and their applications

Ömür Deveci, A. G. Shannon

2020Communications in Algebra19 citationsDOI

Abstract

In this article, we define the complex-type k-Fibonacci numbers and then give the relationships between the k-step Fibonacci numbers and the complex-type k-Fibonacci numbers. Also, we obtain miscellaneous properties of the complex-type k-Fibonacci numbers such as the Binet formulas, the combinatorial, permanental, determinantal representations and the sums. In addition, we study the complex-type k-Fibonacci sequence modulo m and then we give some results concerning the periods and the ranks of the complex-type k-Fibonacci sequences for any k and m which are related the periods of the k-step Fibonacci sequences modulo m. Furthermore, we extend the complex-type k-Fibonacci sequences to groups. Finally, we obtain the periods of the complex-type 2-Fibonacci sequences in the dihedral group D2m,(m≥2) with respect to the generating pairs (x, y) and (y, x).

Topics & Concepts

Fibonacci numberPisano periodMathematicsCombinatoricsModuloFibonacci polynomialsLucas numberType (biology)Sequence (biology)Discrete mathematicsArithmeticChemistryEcologyDifference polynomialsOrthogonal polynomialsBiologyBiochemistryAdvanced Mathematical Theories and ApplicationsFractal and DNA sequence analysisAdvanced Mathematical Identities
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