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http://dx.doi.org/10.4134/BKMS.2015.52.5.1467

GENERALIZED LUCAS NUMBERS OF THE FORM 5kx² AND 7kx²

KARAATLI, OLCAY (SAKARYA UNIVERSITY FACULTY OF ARTS AND SCIENCE)
KESKIN, REFIK (SAKARYA UNIVERSITY FACULTY OF ARTS AND SCIENCE)

Publication Information

Bulletin of the Korean Mathematical Society / v.52, no.5, 2015 , pp. 1467-1480 More about this Journal

Abstract

Generalized Fibonacci and Lucas sequences ( $U_n$ ) and ( $V_n$ ) are defined by the recurrence relations $U_{n+1}=PU_n+QU_{n-1}$ and $V_{n+1}=PV_n+QV_{n-1}$ , $n{\geq}1$ , with initial conditions $U_0=0$ , $U_1=1$ and $V_0=2$ , $V_1=P$ . This paper deals with Fibonacci and Lucas numbers of the form $U_n$ (P, Q) and $V_n$ (P, Q) with the special consideration that $P{\geq}3$ is odd and Q = -1. Under these consideration, we solve the equations $V_n=5kx^2$ , $V_n=7kx^2$ , $V_n=5kx^2{\pm}1$ , and $V_n=7kx^2{\pm}1$ when $k{\mid}P$ with k > 1. Moreover, we solve the equations $V_n=5x^2{\pm}1$ and $V_n=7x^2{\pm}1$ .

Keywords

generalized Fibonacci numbers; generalized Lucas numbers; congruences;

Citations & Related Records

Times Cited By KSCI : 1 (Citation Analysis)

Reference
Cited By KSCI

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1	Olcay Karaatlı. (2016) Periodica Mathematica Hungarica On the Lucas sequence equations $$V_{n}(P,1)=wkx^{2},$$ V n ( P , 1 ) = w k x 2 , $$w\in \left\{ 5,7\right\} $$ w ∈ 5 , 7 / 73 (1) , 73
2	Ümmügülsüm Öğüt. (2017) Arab Journal of Mathematical Sciences On the equation V n = w x 2 ∓ 1 / 23 (2) , 148
2	Refik Keskin. (2016) Periodica Mathematica Hungarica Generalized Fibonacci numbers of the form $$wx^{2}+1$$ w x 2 + 1 / 73 (2) , 165

KSCI

GENERALIZED LUCAS NUMBERS OF THE FORM 5kx2 AND 7kx2

GENERALIZED LUCAS NUMBERS OF THE FORM 5kx² AND 7kx²