[KSCI] Korea Science Citation Index Service

http://dx.doi.org/10.7468/jksmeb.2013.20.3.137

A NOTE ON THE INTEGRAL POINTS ON SOME HYPERBOLAS

Ko, Hansaem (Department of Mathematics, SoongSil University)
Kim, Yeonok (Department of Mathematics, SoongSil University)

Publication Information

The Pure and Applied Mathematics / v.20, no.3, 2013 , pp. 137-148 More about this Journal

Abstract

In this paper, we study the Lie-generalized Fibonacci sequence and the root system of rank 2 symmetric hyperbolic Kac-Moody algebras. We derive several interesting properties of the Lie-Fibonacci sequence and relationship between them. We also give a couple of sufficient conditions for the existence of the integral points on the hyperbola $\mathfrak{h}^a:x^2-axy+y^2=1$ and $\mathfrak{h}_k:x^2-axy+y^2=-k$ ( $$k{\in}\mathbb{Z}_{$ > $0}$$ ). To list all the integral points on that hyperbola, we find the number of elements of ${\Omega}_k$ .

Keywords

Lie-Fibonacci sequence; Lie-Fibonacci number; Kac-Moody algebra; hyperbolic type;

Citations & Related Records

Reference

1	R.A. Dunlap: The golden ratio and Fibonacci numbers. World Science (1997).
2	A.J. Feingold: A hyperbolic GCM and the Fibonacci numbers. Proc. Amer. Math. Soc. 80 (1980), 379-385. DOI ScienceOn
3	A.F. Horadam: A Generalized the Fibonacci Sequence. Proc. Amer. Math. Monthly. 68 (1961), 455-459. DOI ScienceOn
4	V.G. Kac: Infinite-Dimensional Lie Algebras. Cambridge University Press, 1990.
5	S.-J, Kang & D.J. Melville: Rank 2 Symmetric Hyperbolic Kac-Moody Algebras. Nagoya. Math. J. 140 (1995), 41-75.
6	Y. Kim, K.C. Misra & S.J. Stizinger: On the degree of nilpotency of certain subalgebras of Kac-Moody Lie algebras. J. Lie Theory. 14 (2004), 11-23
7	Y. Kim: A note on the rank 2 symmetric Hyperbolic Kac-Moody Lie algebras. J. KSME. SerB. 17 (2010), 107-113
8	Y. Kim: On some behavior of integral points on a hyperbola. submitted.
9	R.V. Moody: Root System of Hyperbolic Type. Adv. in Math. 33 (1979) 144-160. DOI
10	J. Moragado: Some remark on an identy of Catalan concerning the Fibonachi numbers. Portugale Math. Soc. 39 (1980), 341-348.
11	K.S. Rao: Some Properties of Fibonacci numbers. Amer. Math. Monthly. 60 (1953), 680-684. DOI ScienceOn
12	R.V. Moody: A new class of Lie algebras. J. Algebra 10 (1968), 210-230.