A Note on the Fibonacci Sequence and Schreier-type Sets

Abstract

A set A of positive integers is said to be Schreier if either A = or A |A|. We give a bijective map to prove the recurrence of the sequence (|Kn, p, q|)n=1∞ (for fixed p 1 and q 2), where Kn, p, q \ = \ \A⊂ \1, …, n\\,:\, either A = or ( A-2 A = p and A |A| q)\ and 2 A is the second largest integer in A, given that |A| 2. When p = 1 and q=2, we have that (|Kn, 1, 2|)n=1∞ is the Fibonacci sequence. As a corollary, we obtain a new combinatorial interpretation for the sequence (Fn + n)n=1∞.

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