Abstract:

Using general ideas in the study of (Sims, 1967), suborbital graphs produced by imprimitive action on rational projective line of the modular group  were examined. Properties of Farey graph  were extended to suborbital graphs , where   and  (Jones et al., 1991). In our previous study, trees which are subgraphs of the suborbital graphs  consisting of the orbits in  block of  were examined. Relationships of continued fractions with vertices of paths of minimal length on the subgraphs were established and value of the farthest vertex which a vertex can be bound on this path of the suborbital graph  was found (Deger et al., 2011). In the present study, using structure of continued fractions, relationships of values of these type of vertices with Fibonacci numbers in special cases were investigated. As a most important result, equation  was found, where  and value of Fibonacci number sequence for all  natural number is as . In addition, terms of Fibonacci sequence  and  were obtained by using this matrix.

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